Abstract
Here we discuss the current state of knowledge of terrestrial planet formation from the aspects of different planet formation models and isotopic data from 182Hf-182W, U-Pb, lithophile-siderophile elements, 48Ca/44Ca isotope samples from planetary building blocks, recent reproduction attempts from 36Ar/38Ar, 20Ne/22Ne, 36Ar/22Ne isotope ratios in Venus’ and Earth’s atmospheres, the expected solar 3He abundance in Earth’s deep mantle and Earth’s D/H sea water ratios that shed light on the accretion time of the early protoplanets. Accretion scenarios that can explain the different isotope ratios, including a Moon-forming event ca. 50 Myr after the formation of the Solar System, support the theory that the bulk of Earth’s mass (≥80%) most likely accreted within 10–30 Myr. From a combined analysis of the before mentioned isotopes, one finds that proto-Earth accreted most likely a mass of 0.5–0.6 \(M\)Earth within the first ≈3–4.5 Myr, the approximate lifetime of the protoplanetary disk. For Venus, the available atmospheric noble gas data are too uncertain for constraining the planet’s accretion scenario accurately. However, from the available imprecise Ar and Ne isotope measurements, one finds that proto-Venus could have grown to a mass of up to 0.85–1.0 \(M\)Venus before the disk dissipated. Classical terrestrial planet formation models have struggled to grow large planetary embryos, or even cores of giant planets, quickly from the tiniest materials within the typical lifetime of protoplanetary disks. Pebble accretion could solve this long-standing time scale controversy. Pebble accretion and streaming instabilities produce large planetesimals that grow into Mars-sized and larger planetary embryos during this early accretion phase. The later stage of accretion can be explained well with the Grand-Tack model as well as the annulus and depleted disk models. The relative roles of pebble accretion and planetesimal accretion/giant impacts are poorly understood and should be investigated with N-body simulations that include pebbles and multiple protoplanets. To summarise, different isotopic dating methods and the latest terrestrial planet formation models indicate that the accretion process from dust settling, planetesimal formation, and growth to large planetary embryos and protoplanets is a fast process that occurred to a great extent in the Solar System within the lifetime of the protoplanetary disk.
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1 Introduction
Terrestrial planets accrete mass by numerous collisions between small objects that accumulate into larger ones, thereby forming planetesimals, and Moon- and Mars-mass planetary embryos that eventually grow into planets. An illustration of a schematic time scale of the accretion of terrestrial planets is shown in Fig. 1. One can see four main accretion stages: i) dust settling; ii) planetesimal formation; iii) formation of Moon- to Mars-mass planetary embryos; and iv) the accretion of protoplanets up to terrestrial planetary masses by giant impacts (e.g., Morbidelli et al. 2012; Brasser 2013; Johansen et al. 2015; Birnstiel et al. 2016). The bulk composition of the silicate part of terrestrial planets has long been linked to a fraction of carbonaceous chondritic meteorites (CI, CV, CM, etc.), which was mixed with enstatite chondrites (EC) and ordinary chondrites (OC) according to mainly oxygen isotope evidence (Drake and Righter 2002; Dauphas 2017; Bermingham et al. 2020, this journal), and/or ureilite-like material based on recent analysed 48Ca/44Ca data in samples that originated from ureilite and angrite meteorites, as well as from Vesta, Mars and Earth (Schiller et al. 2018).
As illustrated in Fig. 1, depending on their speed of growth before or after disk dissipation and their orbital locations of origin/destination, protoplanets will evolve into objects with different volatile and elemental abundances, which results in different elemental ratios compared to their initial ones due to subsequent atmospheric escape and/or impact erosion of atmospheres and crustal/mantle material (e.g., Lammer et al. 2020a; this journal; O’Neill et al. 2020; this journal).
Safronov (1969) proposed the first physical model for the formation of the terrestrial planets. He suggested that the earliest stage of accumulation of dust into planetesimals was caused by gravitational instabilities in a thin dust layer in the midplane of the protoplanetary disk. Due to their gravitational interaction, the ensuing planetesimals are stirred and can encounter each other. Safronov (1969) showed that the relative velocities between planetesimals are typically of the order of their surface escape velocity, so that each planetesimal’s gravitational cross section is limited by the geometrical one, restricting the accretion rate. Wetherill (1980) built upon these ideas and suggested that the terrestrial planets coagulated from planetesimals, and that the formation of these planets was linked with the evolution of the asteroid belt. Wetherill and Stewart (1989) subsequently showed that in a disk of planetesimals, some would undergo runaway growth and form a sequence of planetary embryos. These embryos would then further collide to form the terrestrial planets.
The past decades have seen much progress in understanding the formation of the terrestrial planets. Models that fully explain the formation of terrestrial planets in the inner Solar System have to explain how planetesimals grow to ≈100 km-scale bodies because of dust coagulation (Johansen and Lambrechts 2017). These planetesimals then further coagulate into Mars-mass or even larger planetary embryos, most likely by planetesimal accretion (Kokubo and Ida 1995; Kokubo and Ida 1998). Finally, terrestrial planet formation models that form Venus, Earth and Mars must match constraints related to the involved planetary embryos and asteroids, including their orbital and compositional distributions as well as their isotope and elemental ratios (Morbidelli et al. 2012; Brasser et al. 2017).
At present, there exists a great variety of terrestrial planet formation models: the Classical model (e.g., Wetherill and Stewart 1989; Chambers 2001; Raymond et al. 2006, 2009), Grand Tack model (e.g., Walsh et al. 2011; Brasser et al. 2017, 2018; Woo et al. 2018), annulus model (Agnor et al. 1999; Hansen 2009; Walsh and Levison 2016), depleted disk model (e.g., Izidoro et al. 2014, 2015; Raymond and Izidoro 2017a) and early instability model (Clement et al. 2019). In contrast, giant planet formation in the solar system has not been studied as extensively (Helled et al. 2013). As such, most of the terrestrial planet formation models in the literature presuppose that terrestrial and giant planet formation can be treated separately because they frequently assume that the giant planets have already formed and reside on their current orbits. Only the Grand Tack model includes the migration of the giant planets. The models listed above tend to study the later stages of terrestrial planet formation, usually focused on the giant impact stage (Chambers 2001) that follows the oligarchic growth phase (Kokubo and Ida 1998). However, we would argue that an additional model of terrestrial planet formation can be constructed based on pebble accretion (e.g., Ormel and Klahr 2010; Lambrechts and Johansen 2012; Lambrechts et al. 2014; Drazkowska et al. 2016). Even though these studies focus primarily on the formation of planets from a stream of pebbles spiralling through the disc and accreting onto a planetary core, Levison et al. (2015b) constructed a model of the formation of the terrestial planets from pebble accretion starting from a planetesimal disk and then ran this all the way through the oligarchic and giant impact phases. Their model suggests that the oligarchic and giant impact phases are a natural outcome irrespective of how the planetesimals are formed and what they subsequently accrete. The only potential difference is the time scale of accretion.
Here we discuss most of the terrestrial planet formation models in varying degrees of depth (Sect. 2). In Sect. 3, we summarise the latest knowledge on terrestrial planet accretion, including time scales that are obtained from data based on the isotopic chronometers 182Hf-182W and U-Pb, lithophile-siderophile elemental isotope data of accreted material, the latest data analysis from 48Ca/44Ca isotope samples from planetary building blocks, recent reproduction attempts of Venus’ and Earth’s atmospheric 36Ar/38Ar, 20Ne/22Ne, 36Ar/22Ne isotope ratios, the evidence of solar 3He abundance in Earth’s deep mantle, and the D/H ratio in Earth’s sea water. These findings are then compared with the various terrestrial planet formation models. Finally, Sect. 4 concludes the review.
2 Terrestrial Planet Formation Models
2.1 The Classical Model for Terrestrial Planet Formation
Wetherill and Stewart (1989) demonstrated that in a protoplanetary disk consisting of equal-mass planetesimals, some would undergo rapid collisions with other planetesimals leading to a phase of runaway growth wherein the mass of the planet increases as d\(M/\)d\(t\ \propto \) \(M \ ^{\beta }\), where \(\beta \) is a free parameter. When \(\beta > 1\) runaway growth occurs. In contrast, if \(\beta < 1\) then the accretion is more egalitarian and no specific body will begin to dominate over the others.
During the earliest stages of planet formation \(\beta =4/3\) due to effective gravitational focusing (Ida and Makino 1993; Kokubo and Ida 1996). Here the planetesimals gravitationally stir each other (Ida and Makino 1993), resulting in their eccentricities and inclinations slowly increasing. Once the eccentricities reach orbit-crossing values, the planetesimals will eventually collide. Under the assumption of perfect mergers, the formation enters a runaway growth phase in which the size-frequency distribution of the bodies in the disk becomes approximately bimodal (Kokubo and Ida 1996). During this phase the solids in the disk consist of approximately lunar- to Mars-sized protoplanets (dubbed planetary embryos) spaced by about 10 mutual Hill radii, which are embedded in a sea of planetesimals (Kokubo and Ida 1998). The Hill radius of a planet is given by \(R_{\mathrm{H}}=a\)(\(m\)pl/3\(M\)star)\(^{1/3}\), where \(a\) is the semi-major axis, \(m\)pl and \(M\)star are the mass of the planet and the star; the mutual Hill radius uses the sum of the masses of two neighbouring planets and the mean of their semi-major axes. During the bimodal phase the planetary embryos gravitationally perturb the planetesimals and each other (Kokubo and Ida 1998). If no gas remains from the protoplanetary disk the system would be unstable, but if any residual gas remains then the eccentricities and inclinations of all bodies are kept low due to damping forces from the gas, and the system is dynamically quasi-stable (Kominami and Ida 2002). The planetary embryos all grow at roughly the same rate as they vie for space and for their ability to accrete planetesimals. This phase is called the oligarchic growth stage, and approximately half of the solid mass within the disk is in the embryos, with the other half being in planetesimals (Kokubo and Ida 1998).
The gas density from the solar nebula decreases with time (e.g. Hartmann et al. 1998) so that the damping forces from the gas disk on the embryos also weaken with time. There comes a point in time when gravitational stirring overcomes the tidal forces from the gas disk (Kominami and Ida 2002, 2004; Kominami et al. 2005). By then, the mutual gravitational perturbations from the embryos cause their eccentricities to rise to orbit-crossing values so that the whole chain eventually becomes dynamically unstable and the system subsequently evolves into a giant impact phase. Here planetary mergers through large impacts are commonplace. Over tens of millions of years these mutual protoplanetary collisions eventually lead to the observed terrestrial planet inventory (e.g. Chambers and Wetherill 1998; Chambers 2001; Raymond et al. 2006, 2009).
The so-called Classical model is based on the evolution described above. Due to limitations in computing power, however, the runaway growth was extremely difficult to model so that simulations of this model began with the Sun being surrounded by a disk of planetesimals and protoplanets that are gravitationally interacting (e.g. Raymond et al. 2006). Typical simulations of the Classical model assume that the gas from the protoplanetary disk has already dissipated (Chambers 2001), and that Jupiter and Saturn have already formed and reside on their current orbits. More recent iterations invoke the presence of gas from the protoplanetary disk due to advances in the theory of planet migration and eccentricity damping (e.g. Tanaka et al. 2002; Tanaka and Ward 2004; Cresswell and Nelson 2008; Paardekooper et al. 2011). In N-body simulations of the model, the protoplanets are usually assumed to have the same size and mass; the same is true for planetesimals. The surface density of material typically has a steep gradient (typically \(\Sigma \propto \mathrm{r}^{-3/2}\)) to match the mass distribution of the planets (Weidenschilling 1977).
Early simulations based on the Classical model of terrestrial planet formation estimates the growth time scale of the terrestrial planets to be tens of millions of years. Overall, numerical simulations indicated that the final terrestrial system would be assembled within 100 Myr (Chambers 2001; Raymond et al. 2006, 2009). In most of these early simulations, however, the resulting planetary systems were found to suffer from excess eccentricity and inclination of the final planets, but the inclusion of a large number of planetesimals–which exert strong dynamical friction on the growing planets–alleviated this concern (O’Brien et al. 2006). Still, a chronic and fundamental shortcoming of the Classical model remained: the output systematically yielded a Mars analogue that was far too massive (e.g. Chambers 2001; Raymond et al. 2006, 2009).
2.2 The Grand Tack Model
The problem of Mars’ low mass compared to Earth’s has been the focus of several recent models of terrestrial planet formation. The most common of these is the Grand Tack model (Walsh et al. 2011), which relies on the early, gas-driven radial migration of Jupiter. The idea behind the model is that after the gas giant formed it opened an annulus in the gas disk and continued migrating towards the Sun (Lin and Papaloizou 1986) because the torques acting on the planet from the protoplanetary disk are imbalanced. At the same time, Walsh et al. (2011) argue that beyond Jupiter Saturn also accreted its gaseous envelope, albeit more slowly. Once Saturn reached some critical mass (as suggested by Walsh et al. (2011) to be 50\(M\)Earth, but it could be lower) it rapidly migrated Sunwards too, caught up with Jupiter and became trapped in the 2:3 mean motion resonance (Masset and Snellgrove 2001). This particular, and fortuitous, configuration of orbital spacing and mass ratio between the gas giants reversed the total torque from the gas disk on both planets (Masset and Snellgrove 2001), thus reversing their migration; the planets ‘tacked’, a term from sailing reflecting a change of direction. Pierens et al. (2014) showed that outward migration is possible with Jupiter and Saturn in both the 2:3 and 1:2 resonances (cf. Zhang and Zhou 2010), but that dynamically stable evolution with little migration may also happen i.e. the planets could stall once they are caught in a resonance. Thus, the inward-outward migration is a possible outcome, but is not guaranteed, and the amount of outward migration depends sensitively on the disk structure and evolution (D’Angelo and Marzari 2012). To ensure that Mars did not grow beyond its current mass, the location of the ‘tack’ of Jupiter was set at 1.5 AU (Walsh et al. 2011). Apart from Mars’ low mass compared to Earth, the Grand Tack scenario can further account for the semi major axis distribution of the terrestrial planets and the stirred demography of the asteroid belt (DeMeo and Carry 2014; Brasser et al. 2019).
The dynamical consequences of the Grand Tack model on the terrestrial planet region are two-fold. First, as Jupiter migrated towards the Sun, it strongly scattered all protoplanets and planetesimals in its path due to its high mass. This scattering places more than half of the mass of the disk from the inner Solar System to farther than 5 AU from the Sun. Second, Jupiter pushed some protoplanets and planetesimals towards the Sun. This shepherding of material mostly occurred within the 2:1 mean motion resonance with the planet. When Jupiter reversed its migration at 1.5 AU it caused a pileup of solid material within 1 AU. Thus, almost all protoplanets and planetesimals that originally formed beyond 1 AU were scattered outwards by Jupiter, with a few pushed within 1 AU. This evolution provides a plausible explanation for the low amount of mass in the asteroid belt region.
Figure 2 shows an example of the evolution of a Grand Tack simulation taken from Brasser et al. (2016). The top-left panel depicts the initial conditions. Jupiter and Saturn are at 3.5 and 4.5 AU, respectively. The protoplanetary disk resides between 0.7 AU and 8 AU, interrupted by the gas giants. The disk contains planetary embryos of 0.05 Earth masses and two thousand planetesimals.
Closer than 1.5 AU the disk is assumed to consist of material similar to enstatite chondrite (EC; green) (Brasser et al. 2017, 2018), while between 1.5 AU and Jupiter the material is akin to ordinary chondrite (OC; orange). The blue dots correspond to the carbonaceous chondrites (CC). Symbol sizes are proportional to their masses; for Jupiter and Saturn a fixed size was chosen so as not to fill most of the panels. As the gas giants migrate inwards (top-right panel) a significant fraction of OC and CC material is ejected while some OC material is pushed closer to the Sun by Jupiter.
After 5 Myr of simulation evolution the gas giants have reversed their migration and stalled close to their current positions (bottom-left). They have emptied out the asteroid belt region and left behind predominantly EC material in the inner Solar System. Earth and Venus have reached approximately half of their masses. By 30 Myr (middle-right) the terrestrial planets are almost fully formed and not much happens after 60 Myr of simulation evolution (bottom-left) to 150 Myr (bottom-right).
The Classical model and the Grand Tack model predict slightly different outcomes for the bulk compositions of the terrestrial planets (Woo et al. 2018). In the Classical model, the planets tend to accrete mostly locally. In contrast, in the Grand Tack model, all the accretion is confined to an annulus between approximately 0.5 AU and 1 AU, but this region also contains material that originated in the outer parts of the protoplanetary disk that was scattered inwards by the migration of Jupiter. Additional contamination of the inner Solar System with material from the outer Solar System occurs during the growth of the gas giants (Raymond and Izidoro 2017b).
2.3 Alternative Model Hypotheses
We briefly mention several alternative models of terrestrial planet formation, which have either not (yet) gained much traction or are too new to have been thoroughly explored, especially for their cosmochemical implications. The first is the annulus model (Agnor et al. 1999; Hansen 2009; Walsh and Levison 2016), wherein solid material in the disk is confined to a narrow region around the Sun, typically between 0.5 AU or 0.7 AU to 1 AU or 1.5 AU. The justification for the inner edge of the annulus model is due to the large mass ratio between Mercury and Venus; in a similar vein, the justification for the outer edge of the annulus is to attempt to reproduce the large mass ratio between Earth and Mars. The rationale for the edges is that a low density of solid material will hinder the Mercurian and Martian embryos from gathering it so that they cannot grow into fully fledged planets such as Venus and Earth.
The second is the depleted disk model (Izidoro et al. 2014, 2015) wherein the mass of the asteroid belt is initially much lower than elsewhere in the protoplanetary disk; a variation of this model (Raymond and Izidoro 2017a) fills the asteroid belt region up with the outwards scattering of material from the terrestrial planet formation zone and the inwards scattering of material from the giant planet region during giant planet migration. This variation is, in essence, no different from the annulus model. In this model, Mars’ small mass compared to Earth’s is caused by the density drop of solid material around 1 to 1.5 AU. As such, the Mars analogue was unable to accrete much material once the Martian embryo had already mostly grown by locally accreting material. The reason for the density drop is left unspoken.
A third model (Clement et al. 2019) invokes a dynamical instability in the outer Solar System wherein the giant planets scatter each other and all material around them. There is ample evidence that such a dynamical instability has occurred (Thommes et al. 1999; Tsiganis et al. 2005; Gomes et al. 2005; Morbidelli et al. 2005; Brasser et al. 2009; Morbidelli et al. 2010; Levison et al. 2011; Nesvorný and Morbidelli 2012; Nesvorný 2015a, 2015b; Brasser and Lee 2015), but thus far it has been assumed that this instability happened after terrestrial planet formation to account for the late heavy bombardment purported to be recorded by the formation of the large lunar impact basins (Tera et al. 1974). In Clement et al. (2019) the authors assume that this dynamical instability occurred early, while the terrestrial planets were still forming. Mars’ low mass is then a result of material in its vicinity being removed by perturbations from the migrating giant planets as they evolved through a high-eccentricity phase. Based on evidence from reset ages of meteorites for radiometric systems with different closure temperature Mojzsis et al. (2019) showed that giant planet migration must have commenced before 4480 million years ago (Ma), lending some support to the early instability model of Clement et al. (2019).
A fourth variation is the pebble accretion model (Ormel and Klahr 2010; Lambrechts and Johansen 2012; Johansen and Lambrechts 2017; Johansen et al. 2020) wherein Sun-wards-drifting pebbles accrete onto large planetesimals or small planetary embryos (Johansen et al. 2015). The high growth rate of pebbles compared to planetesimals is due to dissipation of kinetic energy by gas drag as a pebble is scattered by a growing protoplanet. These embryos then rapidly grow into either the giant planets (Levison et al. 2015a) or the terrestrial planets (Levison et al. 2015b). The radial pebble flux through the protoplanetary disc is a key parameter that determines the final masses of the embryos. Lambrechts et al. (2019) demonstrated that low pebble fluxes lead to the formation of Mars-mass embryos that then go on to collide as in the classical terrestrial planet formation picture. Larger pebble fluxes lead instead to the formation of super-Earths with masses between 1 and 10 times the mass of the Earth. The pebble accretion model is actively studied both in the Solar System and for exoplanets (e.g. Johansen and Lambrechts 2017; Matsumura et al. 2017; Izidoro et al. 2019; Johansen et al. 2020). Furthermore, this model also explores the idea of drifting pebbles piling up in the terrestrial planet region, first forming planetesimals and subsequently the terrestrial planets (Drazkowska et al. 2016). This model is then a precursor for the annulus or depleted disk models.
2.4 The Terrestrial Planet Formation Chart
A good model of terrestrial planet formation should match a variety of criteria. The criteria that we consider here are: fast accretion of mass (<30 Myr; e.g., Kleine et al. 2002; Yin et al. 2002; Yu and Jacobsen 2011; Kleine and Walker 2017, and references therein), the mass-semimajor axis (M-a relation) distribution of the planets, the low mass of Mars (closely related to the first criterion), the angular momentum deficit (AMD) of the planets, the radial concentration distribution (Sr), the timing of the Moon-forming event (Lock et al. 2020, this journal), the isotopic composition of the planets, and the lunar and Martian cratering chronology. We have composed a chart wherein we list each of the criteria from relevant literature sources and whether the models listed above match the criteria. When certain criteria have not yet been tested, we write ‘U’ for ‘Unknown’. Table 1 is filled with the results from the studies listed in the previous subsections, as well as those of O’Brien et al. (2006, 2014), Jacobson et al. (2014), Brasser et al. (2018, 2019) and Woo et al. (2018). The criteria for success vary from one publication to another. Here we have taken the results from literature sources and tallied the successes or failures based on what the authors wrote in their respective publications. Where unclear, we e-mailed the authors with specific requests. An exhaustive list of individual successes and failures is beyond the scope of this work.
We consider the model to work if the success probability for a particular event exceeds 50% in the relevant literature sources (symbol ✓), inconclusive if it falls from 25% to 50% (symbol ∼) and a failure if it is below 25% (symbol ✗). We caution against accepting these results at face value because different studies have different criteria for what is considered a successful semi-major axis relationship, or a mass threshold for a Mars analogue. This table should be considered as indicative only and prompt further investigation into particular aspects of each model. It further has to be noted that the outcome of the simulations and the various models also depend on the behaviour and evolution of the giant planets in the respective simulations. Depending on this evolution, the outcome of the different models can be consistent with each other.
3 Terrestrial Planet Accretion Rates Constrained by Isotopes
As briefly reviewed above, planetesimals and planetary embryos began to form from solid grains originating from the gas and dust in the disk ≈4567 Ma (e.g.; Jacobsen 2003; Bollard et al. 2017). Planetesimals then formed within the first few 105 years (Kruijer et al. 2014) followed by planetary embryos, such as Mars, over the next few million years (Dauphas and Pourmand 2011). The terrestrial planets subsequently formed from accretion of Moon- and Mars-sized planetary embryos that originated at various heliocentric locations. During the past decades, the terrestrial planet formation models and scenarios discussed above used different accretion rates, timing of metal-silicate partitioning, and compositions of planetary building blocks. However, the before-mentioned different model approaches and parameter spaces that are applied by numerous planetary formation modellers (e.g., Morbidelli et al. 2012; Raymond et al. 2004, 2009; O’Brien et al. 2006; Johansen et al. 2007; Izidoro and Raymond 2018; Raymond and Morbidelli 2020; and references therein), and core formation models (magma ocean model, two-stage model, local equilibrium model, see: Jacobsen et al. 2008; and references therein) yield different time scales for the formation of large terrestrial planets like Earth or Venus that lie within a range of ≤30–100 Myr.
Since measurable variations in isotopic ratios of certain elements in terrestrial planets and their atmospheres, as well as in meteorites, provide records of accretion, formation of the core and crust, we briefly review the so-called isotopic chronometers 182Hf-182W and U-Pb (e.g., Jacobsen and Harper 1996; Yin et al. 2002; Halliday 2004; Kleine et al. 2004; Rudge et al. 2010; Jacobsen et al. 2008; Yu and Jacobsen 2011; Kleine and Walker 2017), and isotopic systems such as 50Ti, 54Cr, 92Mo and 100Ru (e.g., Dauphas 2017; Brasser et al. 2018; Woo et al. 2018; Carlson et al. 2018), 48Ca/44Ca isotope systematics (Schiller et al. 2018), atmospheric 36Ar/38Ar, 20Ne/22Ne, 36Ar/22Ne ratios (Marty 2012; Lammer et al. 2020b), the evidence of solar 3He abundance in Earth’s deep mantle and the D/H ratio in Earth’s sea water, that can be used to constrain the accretion time scales of the terrestrial planets.
3.1 Radiometric Dating Systems
3.1.1 182Hf-182W Chronometry for Earth and Mars’ Accretion
The fractionation of gas and dust during the stages of disk formation and accretion of planetesimals in the solar nebula (<5 Myr, Bollard et al. 2017) led to a fractionation between volatile and refractory elements (e.g., Wai and Wasson 1977; Jacobsen et al. 2008). At this early time, Hafnium (Hf) and Tungsten (W) isotopes are not significantly fractionated. The differentiation of planetesimals, planetary embryos and protoplanets, however, leads due to the separation of metal-sulphide melt from silicates to the formation of cores resulting in Hf-W fractionation (e.g., Jacobsen et al. 2008; Kleine and Walker 2017). The Hf-W-system therefore provides the most reliable radiometric chronometer of core formation for terrestrial planets such as the Earth (e.g., Jacobsen and Harper 1996; Harper and Jacobsen 1996; Li and Agee 1996; Halliday and Lee 1999; Halliday and Lee 1999; Halliday 2000; Kleine et al. 2002, 2004; Yin et al. 2002; Jacobsen 2005; Wood and Halliday 2005; Jacobsen et al. 2008; Kleine et al. 2009; Yu and Jacobsen 2011; Kleine and Walker 2017).
The elements Hf and W are both highly refractory trace elements. Hafnium is a lithophile element and strongly partitioned into the silicate portion of a planet, while W is moderately siderophile and partitioned preferentially into the coexisting metallic phase. Therefore, ≥90% of Earth’s W has moved into the core during its formation (Halliday 2000) (see Fig. 3a), making the history of planetary bodies and the timing of accretion, differentiation, and core formation a valuable dating technique in planet formation (Kleine et al. 2009).
The basic principles of the 182Hf-182W chronometry method are briefly described below. 182Hf decays to 182W via 182Ta with a short half-life time of 8.9 Myr. Initially, their parent and trace elements should be in chondritic portions ≈1:1 in the early Solar System bodies because both elements are highly refractory (e.g., Jacobsen and Harper 1996; Halliday and Lee 1999; Halliday 2000; Kleine and Walker 2017).
As mentioned above Hf is lithophile and remains in the mantle but W, which exists preferentially into the metallic phase, sinks into the core. Therefore, the parent-to-daughter ratio \(f\)Hf/W is perturbed by the formation of the core (e.g. Kleine and Walker 2017; and references therein). The residual silicate portion in Earth’s crust and mantle is commonly described as the bulk silicate Earth (BSE) and has a \(f\)Hf/W in the range of ≈10–40 (Newsom et al. 1996). More recent studies that correlated W with other refractory lithophile trace elements such as U, Th, Ta and Ba (McDonough 2003; Dauphas and Pourmand 2011; König et al. 2011) indicate that \(f\)Hf/W of the BSE is \(18.8 \pm 5\) (Kleine and Walker 2017). This value is an order of magnitude higher than the chondritic value (see Fig. 3b). If the fractionation of Hf from W caused by core formation takes place during the lifetime of 182Hf, an excess 182W relative to other isotopes of W should develop in the silicate portion of the planet because of an enhanced \(f\)Hf/W as illustrated in Fig. 3b.
By using 182Hf-182W chronometry and the ratio \(f\)Hf/W one can now constrain the rate of Earth’s accretion and the timing of core formation by geochemical models. Several Moon- to Mars-mass planetary embryo impactors released enough energy that proto-Earth produced temporary magma oceans so that core formation could take place (e.g., Rubie et al. 2007).
The segregation of metal and hence core formation occurs within the early magma ocean state with a metal-silicate equilibrium at very high pressure and temperature (e.g., Rubie et al. 2003; Jacobsen 2003; Kleine and Walker 2017). Core formation models assume that the terrestrial planets accrete dust and planetesimals with a chondritic Hf/W ratio related to an Hf and W-isotopic composition. Jacobsen and Harper (1996) suggested a model that assumes local equilibrium at which the newly added material to the growing protoplanet immediately differentiates into metal and silicate, with the metal sinking to the core without equilibrating with the remaining silicate mantle. However, this local equilibrium model results in a very long mean-time for Earth’s core formation of ≈108 Myr (≈4460 Ma) with a 90% core-formation time of the order of ≈250 Myr (≈4318 Ma) (Jacobsen and Harper 1996; Jacobsen et al. 2008). A reason for this long time-scale is that the newly segregated core material in this model reflects only the average isotopic composition of the delivered material.
This long core formation mean-time is also not in agreement with the strong evidence for an early silicate differentiation at ≈4530 Myr ago from measured 143Nd/144Nd and 142Nd/144Nd ratios of the 3800 Myr ago supracrustal rocks of Isua from West Greenland (Harper and Jacobsen 1992; Jacobsen and Harper 1996; Boyet et al. 2003; Caro et al. 2003; Boyet and Carlson 2005; Bennett et al. 2007; Jacobsen et al. 2008). These findings led to a general consensus that the related Sm-Nd-systematics i.e. the fractionation of Sm/Nd taking place within the first 100 Myr after the origin of the Solar System, i.e. before 4468 Ma. This would also indicate that the Moon-forming event, which led to the last magma ocean, occurred within the first 100 Myr (e.g. Touboul et al. 2007; Asphaug 2014; Lock et al. 2020, this journal).
Li and Agee (1996) developed a so-called metal pond core formation model, where the authors assumed that the newly segregated material is equilibrated at the bottom of the magma ocean at roughly 1000 km. Harper and Jacobsen (1996) and Jacobsen (2005) developed the so-called magma ocean differentiation model, where the newly segregated core material reflects the average isotopic composition of the silicate mantle due to full equilibrium in a magma ocean. Today, the magma ocean model is the most widely used core formation model related to the interpretation of early Earth’s Hf-W-chronometry studies (e.g., Yin et al. 2002; Wood and Halliday 2005; Jacobsen et al. 2008; Kleine et al. 2009; Yu and Jacobsen 2011; Kleine and Walker 2017). Two-stage accretion scenarios yield results between the magma ocean model with complete equilibration between metal and silicates and the local equilibrium model (e.g., Jacobsen et al. 2008; references therein).
Experimental work and model results indicate that the primitive mantle abundances of the moderately siderophile elements Fe, Ni, Co, Mo, W, P, the moderately siderophile element Ge and the highly siderophile element Re are consistent with a so-called metal-silicate equilibrium at the base of a 700 to 1000 km deep magma ocean in the early Earth, and hence a homogeneous accretion (Righter and Drake 2020; Righter et al. 2011). During the stage of planetary embryo formation surface temperatures can reach up to 2000–3000 K (Ikoma and Genda 2006; Bouhifd and Jephcoat 2011; Stökl et al. 2016), so that deep magma oceans would have been present (Lammer et al. 2020a, this journal; 2020b).
By assuming complete metal-silicate equilibrium the Hf-W systematics yield a fast accretion of the main mass of the Earth within 10 Myr (Wade and Wood 2005; Jacobsen et al. 2008). The Moon-forming event, however, finished Earth’s main phase of accretion between ≥30 Myr (e.g., Jacobsen 2005; Albarède 2009; Barboni et al. 2017; Thiemens et al. 2019) to ≈100 Myr (e.g., Halliday 2008; Halliday and Wood 2009; Boyet and Carlson 2005; Connelly et al. 2019) i.e. between 4538 Myr and 4468 Myr ago. Metal segregation happens faster than accretion (Jacobsen and Harper 1996; Jacobsen et al. 2008, and references therein), so that the time scale of core formation is generally used to constrain Earth’s accretion rate (e.g., Rudge et al. 2010; Yu and Jacobsen 2011; Kleine and Walker 2017; and references therein). Equilibrium two-stage model results for Hf-W systematics agree with accretion ages of \(\approx 31.0 \pm 4.4\) Myr (Rudge et al. 2010; Kleine and Walker 2017), meaning that core formation was established by \(4537 \pm 4.4\) Myr ago.
According to these studies, the 182Hf-182W chronometry method indicates that at least 80% of the early Earth must have accreted in ≤35 Myr, while the final ≈10% must have been accreted by 120 Myr. In partial metal-silicate equilibrium models, proto-Earth would have accreted ≈0.63 \(M\)Earth after a duration of some 10–25 Myr (Jacobsen et al. 2008; Mamajek 2009; Rudge et al. 2010; Kleine and Walker 2017; Morbidelli 2018).
Yu and Jacobsen (2011) showed that one could overcome discrepancies mainly explained by metal-silicate disequilibrium during giant impacts in Hf-W systematics by including constraints from partitioning of refractory siderophile elements Ni, Co, W, V, and Nb during core formation. These authors found that the concentrations of the siderophile elements in the mantle are consistent with high-pressure metal-silicate equilibration in a terrestrial magma ocean (Righter and Drake 2020; Righter et al. 2011). In this study, the earliest time the Moon-forming event could have taken place is at roughly 30 Myr after the origin of the Solar System. Under these assumptions, the model of Yu and Jacobsen (2011) indicate that the timing of the Moon-forming event is inversely correlated with the time scale of Earth’s main accretion stage of the first 0.87 \(M\)Earth.
If the Moon-forming giant impact occurred later than 50 Myr (i.e. after 4510 Myr ago), the main stage of early Earth’s accretion would need to have occurred before \(<10.7 \pm 2.5\) Myr, while an earlier Moon-forming event would increase the time taken for Earth’s primary accretion (Yu and Jacobsen 2011). To summarise, the evidence for Earth’s (terrestrial planet) accretion from 182Hf-182W chronometry within its uncertainties results in a time scale for the main mass accretion of 8.2–35 Myr and proto-Earth masses at the time when the disk dissipated at 3.5–4 Myr (Bollard et al. 2017; Wang et al. 2017) of 0.5–0.75 \(M\)Earth, if one assumes full metal-silicate equilibrium (Yin et al. 2002; Jacobsen et al. 2008; Rudge et al. 2010; Yu and Jacobsen 2011; Kleine and Walker 2017). Yu and Jacobsen (2011) obtain a mass for proto-Earth at roughly 4 Myr that is of the order of 0.56 \(M\)Earth with a Hf/W ratio of ≈15 and a late giant Moon-forming impact ≥52 Myr (i.e. after 4510 Myr ago).
As was shown in Lammer et al. (2020a, this journal; 2020b), if proto-Earth accreted in excess of >0.58 \(M\)Earth during the lifetime of the solar nebula, the present-day atmospheric 36Ar/38Ar, 20Ne/22Ne and 36Ar/22Ne ratios (see also Sect. 3.2.4) cannot be reproduced through EUV-driven hydrodynamic escape of a thin primordial atmosphere. Moreover, these authors also show that if the proto-Earth accreted >0.7 \(M\)Earth during the disk lifetime (≈4 Myr), it would need hundreds of Myr or even Gyrs to lose its primordial atmosphere. One can therefore conclude that the upper mass of proto-Earth at 4.0 Myr, i.e. the time when the disk dissipated, should have been ≤0.58 \(M\)Earth (Lammer et al. 2020b).
The analysis of 182Hf-182W chronometry for dating Mars’ accretion is more complex because one cannot measure the Hf/W ratio of bulk silicate Mars (Kleine and Walker 2017). In Mars’ case one must compare the abundance of W to other lithophile elements that have the same incompatibility as W. If one assumes that refractory elements such as U, Th, Hf and W occur in chondritic relative portions in bulk Mars, than Hf/W of bulk silicate Mars can be estimated from U/W × chondritic Hf/U or Th/W × chondritic Hf/Th of Martian rock samples (Dauphas and Pourmand 2011). By using this assumption, two-stage accretion models yield a core formation age for Mars of \(4.1\pm 2.7\) Myr, while exponential growth models for Mars yield ≈63% accreted mass at roughly 2.4 Myr and up to ≤10 Myr for the remainder of Mars’ accretion (Dauphas and Pourmand 2011; Kleine and Walker 2017). Using 60Fe-60Ni chronometry, Tang and Dauphas (2014) independently obtained the same accretion time scale. Thus, one can say that Mars was almost fully formed when the disk dispersed after 3.3–4.5 Myr (Bollard et al. 2017; Wang et al. 2017).
3.1.2 Uranium-Lead (U-Pb) Isotopic Dating System
The U-Pb dating system is one of the earliest radiometric dating schemes that was used for dating rocks that crystallised between millions of years to over 4500 Ma (e.g., McDonough and Sun 1995; Kellogg et al. 2007; Jacobsen et al. 2008; Schaltegger et al. 2015). Because the exact rate at which U decays into Pb is well known, the current ratio of Pb to U in a rock sample can be used to determine its age, provided that in the interim no Pb loss occurred. The U-Pb dating system relies on two separate isotope decay chains: the first one is from 238U to 206Pb, with a half life of 4.47 Gyr, while the second decay chain begins at 235U which decays to 207Pb with a half life of 710 Myr. U-Pb systematics applied to Earth’s mantle suggest that the time it takes for the Earth to grow to ≈0.63 \(M\)Earth is 56–130 Myr for an equilibrium two-stage model, and 21.5–51 Myr for an exponential growth model (Rudge et al. 2010).
Compared to 182Hf-182W systematics of Earth’s mantle discussed above, U-Pb systematics yield accretion time scales that are much longer (e.g., Halliday 2004; Kleine et al. 2004; Rudge et al. 2010; Kleine and Walker 2017). Because U-Pb chronometers are long-lived chronometers that are susceptible to geological processes throughout Earth’s history, as well as at its beginning, this method does not give as strong an accretion constraint as the Hf-W chronometer (Jacobsen et al. 2008; Kleine and Walker 2017; and references therein).
The blanketing effect of the H2/He-dominated primordial atmosphere that surrounded growing protoplanets during and, depending on their mass, also some time after the disk lifetime, as well as collisions between Moon- to Mars-mass planetary embryos that were involved in the growth of proto-Earth and Venus, released enough energy to produce a global magma ocean (e.g., Jacobsen et al. 2008; Lammer et al. 2020a, this journal; 2020b), so core formation as discussed before started much earlier than estimated by the U-Pb chronology (e.g., Rubie et al. 2007; Kleine and Walker 2017). Due to this discrepancy, Kamber and Kramers (2006) and Yin and Jacobsen (2006) suggested that U-Pb systematics do not constrain core formation since bulk Earth’s U/Pb ratio and the Pb isotopic composition are not known well enough. Moreover, the discrepancy in accretion time scales related to U-Pb systematics may be caused by a late segregation of Pb-bearing sulphides into Earth’s core (Wood and Halliday 2005; Halliday and Wood 2007), disequilibrium during core formation (Halliday 2004; Allègre et al. 2008), and the possible addition of Pb during the late veneer (Albarède 2009). To summarise this brief discussion: according to Rudge et al. (2010) and Kleine and Walker (2017), one can conclude that U-Pb systems contain little information on the early accretion, but constrain Earth’s late accretion phase very well.
However, the main uncertainties between Hf-W and U-Pb systematics for the determination of the core formation time-scale is the strong dependence on the metal-silicate equilibrium (e.g., Kleine et al. 2002; Allègre et al. 2008) and the uncertainties in knowledge related to the bulk Earth Pb isotopic composition and U/Pb ratio (e.g., Yin and Jacobsen 2006). One can bring the Hf-W and U-Pb age determinations into agreement if one assumes a full metal-silicate equilibrium combined with a very fast early accretion that subsequently slowed down and was followed by a long phase of much slower growth culminating in a late giant impact, i.e., the Moon-forming event (Rudge et al. 2010; Yu and Jacobsen 2011).
Moreover, Kellogg et al. (2007) showed that a mean age of accretion and core formation of ≈10 Myr is consistent with the isotopic composition of modern mid-ocean ridge basalts when taking into account recycling of continental and oceanic crusts into the mantle over time. This result agrees with the study of Rudge et al. (2010) that there is no need to infer a late core formation to explain Earth’s Pb isotopic composition. According to Jacobsen et al. (2008) it seems that the fractionation of U-Pb in the nebula is a dominant process so that the core-related fractionation has to be very accurately determined compared with the volatile-related fractionation in order to obtain accurate results for the timing of core formation based on the U-Pb-system. Therefore, the U-Pb-isotopic dating system does not place strong constraints on the chronology of accretion and core formation.
3.2 Constrains from Lithophile-Siderophile Isotope Data, 48Ca/44Ca-Systematics and Noble Gases
3.2.1 Earth’s Accretion Constrained by Lithophile-Siderophile Elements
For decades, researchers have tried to estimate Earth’s bulk chemical composition by comparison with meteorites. Clayton (1970) found that Earth’s oxygen composition is different compared to most meteorites apart from the silicon-rich and highly reduced enstatite chondrites. However, the chemical composition of enstatite chondrites is very different compared to rocks on Earth’s surface (e.g., Drake and Righter 2002; Carlson 2017), so the community continued to assume that the more oxidised and volatile-rich carbonaceous chondrites were involved in early Earth’s accretion.
Recently Dauphas (2017) used the unique isotope content of different types of meteorites to identify those that could have been involved in Earth’s accretion over time. He calculated that the isotopic mantle signatures of lithophile elements such as O, Ca, Ti and Nd, and moderate to highly siderophile elements like Cr, Ni, Mo and Ru recorded different accretion stages of the early Earth. Dauphas (2017) showed that these elements point to a large fraction of Earth’s building blocks, some 70%, that were isotopically similar to enstatite meteorites. It was found that for the first 60% of its accretion, proto-Earth most likely formed from a mixture of an isotopic composition of 51% enstatite, 40% ordinary chondrites and 9% carbonaceous chondrites (i.e. 5.4% CC in total). For the second accretion stage, i.e. the next 60–99.5% of Earth’s mass, and for the final 0.5% accreted during the late veneer, the isotopic record of these elements are mainly akin to enstatite chondrite-like material.
At the same time, Fischer-Gödde and Kleine (2017) concluded from Ru isotopic measurements from a sample of meteorites that material arriving as late accretion was relatively dry and isotopically identical to enstatite chondrites. This finding is also in support of Dauphas (2017) that states enstatite chondrites most likely played an important role in the accretion of the Solar System’s terrestrial planets, although in an earlier study Wang and Becker (2013) state that S, Se and Te abundance in the terrestrial mantle requires a volatile-rich late veneer. Carlson et al. (2018) conclude that the composition of the planetary building blocks changes over time and Earth’s deep interior should have a different composition compared to its surface layers. However, the findings and three-stage accretion model presented by Dauphas (2017) neither gives a time scale for the two main accretion stages nor describes how much mass was accreted while the planet was embedded within the disk or after its dispersal.
3.2.2 Accretion Rates of Inner Disk Mass Versus Time Obtained from 48Ca/44Ca Isotope Data
Current models that study the formation of planetary embryos from dust settling to planetesimal formation via pebbles (that originate from the same flow) struggle to explain the different compositions of Solar System bodies (e.g., Johansen et al. 2015; Morbidelli 2018). Schiller et al. (2018) measured the 48Ca/44Ca isotope content in samples from Earth, Mars, Vesta, and the angrite and ureilite parent bodies. Here, \(\mu {}^{48}\)Ca corresponds to the 48Ca/44Ca ratio relative to that in the terrestrial reference standard, given in parts per million (p.p.m.). A positive correlation between 48Ca/44Ca isotope ratios and planetary masses was identified. To explain these findings, a highly debated and unorthodox view of planetary growth is proposed by these authors. Schiller et al. (2018) suggest that pebble accretion is correct, however, the different bodies were growing at the same rate but stopped growing at different times (Schiller et al. 2018; Morbidelli 2018). This hypothesis is non-conventional because the mainstream theory is that bodies of different masses and at different locations grew at different rates during the lifetime of the disk. Figure 4 illustrates their hypothesis of planetary accretion. In the model approach of Schiller et al. (2018), the gas and dust in the disk surrounding the young Sun initially contained inner-disk material with low \(\mu {}^{48}\)Ca \(\approx -150\) ppm, similar to the ureilites, and outer disk particles with high \(\mu {}^{48}\)Ca values of \(\approx +200\) ppm, which corresponds to carbonaceous chondrites.
In this scenario, the planetesimals and planetary embryos grew by accreting matter from the inner disk. The inner disk started to be fed with inwards-drifting pebbles and, after some time, the inner-disk material was largely supplemented by the material from the outer disk, resulting in an increase of the mean \(\mu {}^{48}\)Ca value of the inner disk. The planetary embryos continued to grow until they were displaced by perturbations from other bodies. The assumed \(\mu {}^{48}\)Ca mixing from the inner and outer material resulted in values of \(\mu {}^{48}\)Ca \(\approx -100\) p.p.m. for Vesta, \(\approx -20\) p.p.m for Mars and 0 p.p.m. for Earth and the Moon. From their analysis, the authors conclude that proto-Earth grew to ≈0.8 \(M\)Earth within the disk lifetime and its accreted material consisted of ≈60% Ureilite and ≈40% CI-chondrite-like material (which are the end-members of the model). This rapid accretion is difficult to reconcile with current dynamical and Hf-W chronometry models (e.g. Carlson et al. 2018; Yu and Jacobsen 2011).
In a brief report, Morbidelli (2018) remarked various inconsistencies within the hypothesis proposed by Schiller et al. (2018). One problem is that, for the Earth, the model of Schiller et al. (2018) requires about 0.4 \(M\)Earth to be accreted from the outer disk, which is higher than previous calculations by Dauphas (2017) and Morbidelli et al. (2016). However, the previously mentioned studies did not include ureilite-like material in their models because of the inability from the existing samples of the Ureilites and other achondrites to obtain the bulk elemental concentrations of the parent body that the models require.
The added outer Solar System material is represented isotopically in Ca ratios of CI chondrites (Schiller et al. 2018). The composition of the proto-Earth as inferred by Schiller et al. (2018) is not in agreement with the isotope measurements of the lithophile, moderately and highly siderophile elements of the material out of which Earth’s mantle accreted, as determined by Dauphas (2017), since it does not include a high amount of enstatite material (see also Sect. 3.1.2) because Schiller et al. (2018) focused on an end-member model only. Furthermore, it is unlikely that a terrestrial mantle consisting of 40% CI chondrite is consistent with the terrestrial Mg/Si elemental ratio as well as with oxygen, titanium, chromium and other isotopic systems. Recently, Schiller et al. (2020) claim that terrestrial Fe isotopes are nearly identical to those of CI chondrites. From their measurements they imply that the terrestrial mantle consists of 40% CI. It is clear that further studies are needed to resolve this dilemma.
One should also note that Lammer et al. (2020b) concluded that protoplanets that accreted masses of >0.58 \(M\)Earth within the disk lifetime of 3.3–4.5 Myr (Bollard et al. 2017; Wang et al. 2017) would capture a primordial atmosphere that is too massive to be consistent with the present atmospheric ratios, while a proto-Earth with a mass of ≥0.7 \(M\)Earth at 4 Myr likely ends up as a gas dwarf (e.g., Owen and Wu 2016; Fossati et al. 2017; see also Lammer et al. 2020a; this journal).
As shown in Fig. 5, it is possible to reproduce the present-day atmospheric Ar and Ne noble gas ratios of the Earth with a composition as suggested by Schiller et al. (2018) but not by growing up to 80% of its mass within the nebula (that dispersed at 3.3–4.5 Myr). In such a case proto-Earth accretes up to ≈0.53–0.58 \(M\)Earth within the gas disk and grows fast up to ≥0.8 \(M\)Earth immediately afterwards and still before the escape of a tiny captured primordial atmosphere (within <7 Myr) through planetesimal accretion. Afterwards mainly CCs or CIs–as suggested by Schiller et al. (2018)–that are depleted in the noble gases and moderately volatile elements finalised Earth’s accretion. In such a case, the process after disk dispersal would be a complex interplay between EUV-driven hydrodynamic and impact-induced atmospheric escape combined with mass accretion. Such a fast accretion scenario also fits with the Hf-W chronometry for \(f\)Hf/W ≈15, if full metal-silicate equilibrium is assumed (Rudge et al. 2010; Yu and Jacobsen 2011; Kleine and Walker 2017) (see also Sect. 3.1.1).
To conclude, the controversial hypothesis of Schiller et al. (2018) may give some answers as to why different Solar System bodies have varying compositions if they grew from the accretion of the same flow of pebbles (cf. Morbidelli 2018), but it neither agrees with the isotopic nature of Earth’s accreting material, as inferred by Dauphas (2017), (see also Sect. 3.2.1) nor are the implications clear for other isotopic systems and for the elemental abundances within the Earth. Future research will have to show how the \(\mu {}^{48}\)Ca isotope data connects with the other isotopical, chemical, chronological and dynamical constraints of terrestrial planet formation.
3.2.3 Constraining Early Earth’s and Venus’ Accretion by Reproducing Their Atmospheric 36Ar/38Ar, 20Ne/22Ne, 36Ar/22Ne Isotope Ratios
Besides the before mentioned dating methods, 36Ar/38Ar, 20Ne/22Ne and 36Ar/22Ne noble gas isotope ratios in Earth’s and Venus’ atmospheres also provide important information on the origin and evolution of these planets (e.g. Pepin 1991, 1997; Gillmann et al. 2009; Odert et al. 2018; Lammer et al. 2020a, this journal; Lammer et al. 2020b). Previous studies (e.g., Pepin 1991, 1997; Gillmann et al. 2009; Odert et al. 2018) that have tried to reproduce the present atmospheric isotope ratios of these noble gases during the past-applied arbitrary assumptions related to the EUV flux of the young Sun, simple atmospheric escape models and initial H2-rich reservoirs related to primordial and steam atmospheres.
Marty (2012) analysed the Ar and Ne abundances in the present atmosphere of the Earth and found that the ratios of today’s atmosphere and concentrations of water, carbon and nitrogen indicate a volatile content equivalent to ≈98% non-chondritic depleted/dry proto-Earth with only ≈2% contribution of carbonaceous chondritic material. As discussed above, Dauphas (2017) analysed isotopic signatures of lithophile, moderately siderophile and highly siderophile elements from Earth’s mantle material and concluded that roughly 5% carbonaceous chondritic material was involved in early Earth’s accretion. As discussed above, more recently, Schiller et al. (2018) inferred from the analysis of 48Ca/44Ca isotope ratios in various early Solar System objects, that proto-Earth accreted roughly 40% carbonaceous chondrites (mainly CI chondrites) at the time when the disk dissipated. This value is roughly comparable to that obtained by Warren (2011), who uses the lever method to obtain ≈24–32%. In the case that proto-Earth accreted higher amounts of carbonaceous chondritic material compared to the 2% inferred from today’s data (Marty 2012), thermal processing in a possible primordial atmosphere and atmospheric escape from accreting planetary embryos and the growing protoplanet could have been depleted in these volatile elements (Odert et al. 2018; Benedikt et al. 2020; Young et al. 2019; Lammer et al. 2020a, this journal; 2020b), altering the bulk and isotopic composition.
Recently, Lammer et al. (2020b) reproduced Earth’s present atmospheric 36Ar/38Ar, 20Ne/22Ne and 36Ar/22Ne noble gas isotope ratios within realistic young Sun and initial H2-reservoir conditions by applying a sequence of sophisticated impact and upper atmosphere escape models.
These authors studied the boil-off phase of primordial H2-dominated atmospheres that accumulate around protoplanets with different masses during the accretion in the disk phase. They applied a hydrodynamic upper atmosphere model for the escape calculation of possible H2-envelopes that remained during disk dispersal on various protoplanetary masses, including impact erosion, delivery, and composition/ratio modifications. The atmosphere evolution studies were carried out by including the young Sun’s EUV flux as constrained by an activity-rotation relation of young solar-like stars according to Tu et al. (2015).
Finally, Lammer et al. (2020b) could reproduce Earth’s present 36Ar/38Ar, 20Ne/22Ne and 36Ar/22Ne and Venus’ 36Ar/38Ar, 20Ne/22Ne noble gas ratios within the uncertainties of the parameter space, by proto-Venus and proto-Earth growing to masses of up to 0.68–0.81\(M\)Earth and 0.53–0.58 \(M\)Earth, respectively, at 4 Myr at the time when the disk dissipated.
In early Earth’s case, today’s atmospheric 36Ar/22Ne ratio of 18.8 (Marty and Allé 1994; Marty 2012) can be best reproduced by Lammer et al. (2020a, 2020b) if the post-nebula impactors (of a combined mass of 0.15–0.3 \(M\)Earth) contain roughly 5% carbonaceous chondritic material (see Fig. 5; dashed lines) if one assumes an initial composition as suggested by Dauphas (2017), and ≥70% (see Fig. 5; solid lines) if they assume the composition as expected by Schiller et al. (2018). The 95% and ≤30% of the accreted post-nebula material has to be depleted in the studied elements and hence originates from volatile-poor material.
Figure 5 shows reproduction attempts of Earth’s present atmospheric Ar and Ne noble gas ratios when the proto-Earth was 0.55\(M\)Earth at the time when the disk dissipated at 4 Myr. In such a case, a tiny primordial H2-dominated atmosphere with a mass fraction of about \(3.5\times 10^{-5}\) \(M\)Earth remained after the boil-off phase during disk dispersal (Lammer et al. 2020a, this journal; 2020a). The growing proto-Earth lost this tiny primordial atmosphere during ≤3 Myr afterwards by impact erosion and EUV-driven hydrodynamic escape of H atoms that drag and fractionate the Ar and Ne isotopes.
In Venus’ case, the reproduction of its atmospheric 36Ar/38Ar and 20Ne/22Ne isotope ratios is more uncertain due to the large error bars of the available measurements of previous spacecraft. According to Lammer et al. (2020b) Venus’ present atmospheric Ar and Ne isotope ratios can be reproduced if it captured a primordial atmosphere that corresponds to a mass for proto-Venus of ≈0.83–1 \(M\)Venus at the time when the disk dissipated. If this were the case this would indicate that Venus accreted faster than Earth. As pointed out by Dandouras et al. (2020, this journal), future Venus missions that will precisely re-measure the atmospheric noble gas ratios are necessary to constrain the initial composition and evolution of Venus.
3.2.4 Constraining Early Earth’s Accretion by 3He, and 20Ne/22Ne, Isotope Data from the Deep Mantle
The question of whether the growing proto-Earth was surrounded by at least a low-mass primordial atmosphere has long been debated (e.g., Hayashi et al. 1979; Mizuno et al. 1980; Jacobsen and Harper 1996; Harper and Jacobsen 1996; Porcelli et al. 2001; Dauphas 2003; Yokochi and Marty 2004; Jacobsen et al. 2008; Raquin and Moreira 2009; Hallis et al. 2015; Jaupart et al. 2017; Péron et al. 2016; Williams and Mukhopadhyay 2019). That early Earth most likely accreted partially before and after the nebular disk dispersed was discussed by Harper and Jacobsen (1996), who studied the abundance of 3He and the before mentioned Ne isotopes in the mantle. In such a two-stage accretion scenario hypothesis, proto-Earth accreted enough mass during the disk lifetime to attract an H2-He-dominated primordial atmosphere directly from the nebular gas. For explaining the evidence of the solar-like Ne and He noble gas abundances, as well as the presence of a large 129Xe excess in the deep Earth, Harper and Jacobsen (1996) and Jacobsen et al. (2008) suggest, that these elements were embedded in the solar-like H2-He-dominated primordial atmosphere, dissolved in the magma ocean and transported into the deep Earth. Additionally, planetesimals and dust continuously added noble gas components into the growing protoplanet. Although, the presence of a large 129Xe excess, produced in the deep mantle due to a fast radioactive decay of 129I with a half-life of 15.7 Myr, is consistent with a very early atmosphere (Jacobsen and Harper 1996; Jacobsen et al. 2008; Caracausi et al. 2016; Avice et al. 2017), the initially produced 129Xe is contaminated by Xe isotopes that were delivered during the late veneer. A detailed discussion on Xe isotopes and their perspectives on atmospheric evolution on Earth, Venus and Mars can be found in Avice and Marty (2020, this journal).
According to Harper and Jacobsen (1996), the inferred 3He abundance from deep-mantle plumes of Hawaiian volcanos (e.g., Poreda and Craig 1992; Harper and Jacobsen 1996; Timmerman et al. 2019) is more or less comparable to the abundance observed in primitive carbonaceous chondrites (e.g., Mazor et al. 1970; Kellogg and Wasserburg 1990), but is much higher compared to all the other highly volatile elements in the deep Earth. This evidence is thought to be a primitive un-degassed reservoir that was preserved from the early accretion stages, when the planetary body was not large enough to support the energy of the impacts over the degassing threshold (Atreya et al. 1989; Harper and Jacobsen 1996; Jacobsen et al. 2008).
On the other hand, one can expect that Earth’s deep mantle should also be depleted in 3He in a similar way as the other volatiles, because of volatile depletion in proto-Earth’s nebula source reservoir, metamorphic degassing in planetesimals, as well as degassing from large planetesimals and planetary embryos during accretion (Harper and Jacobsen 1996; Jacobsen et al. 2008; Lichtenberg et al. 2016, 2018; Benedikt et al. 2020; Lammer et al. 2020a, this journal). Short-lived radioactive isotopes such as 26Al, and 60Fe also determine the thermal history and interior structure of the early planetary building blocks additionally to impacts and gravitational energy (Lichtenberg et al. 2016, 2018). The following thermo-mechanical evolution results in internal differentiation, which is related to a rapid volatile outgassing that was recently studied in Benedikt et al. (2020) and also discussed in Lammer et al. (2020a, this journal).
Therefore, the primordial 3He, which was accreted to the Earth through the delivery of carbonaceous chondrites, should have been efficiently lost, similar as the other volatile elements, compared to its initial abundance in the primitive meteorite value. By comparing the 3He abundance with other highly volatile elements that should have been accreted from the same building blocks, Harper and Jacobsen (1996) argued that the inferred 3He abundance in the deep Earth is at least two orders of magnitude higher than that expected from accretion of dust and planetesimals, which was probably most likely ≤1% of its initial value (Harper and Jacobsen 1996; Jacobsen et al. 2008). Because of this paradox, these authors concluded that the 3He in Earth’s deep mantle cannot be an accreted primitive component but is most likely a remnant of a magma ocean equilibration-related primitive H2-He-dominated primordial atmosphere.
The preservation of such a primordial helium reservoir over the Earth’s history has been questioned on the basis of geophysical evidence of slab subduction into the lower mantle and mantle convection models (e.g., Van der Hilst et al. 1997; Meibom et al. 2003; Class and Goldstein 2005; Parman 2007). Recent studies, however, confirmed such a reservoir of primordial helium from studies of the hottest mantle plumes (Jackson et al. 2017) and from measured He-Sr-Pb isotope ratios in superdeep diamond fluid inclusions from the transition zone in a depth of 410–660 km which is unaffected by degassing and shallow crustal contamination (Timmerman et al. 2019). These authors conclude that their findings are indications that a less degassed, high-3He/4He deep mantle source infiltrates this transition zone, where it interacts with recycled material, creating the diverse compositions recorded in ocean island basalts. This is, furthermore, an indication of a dense high-3He/4He deep-mantle domain that could have remained isolated from the convecting mantle (e.g., Samuel and Farnetani 2003, which explains and supports the preservation of very early (>4500 Ma) geochemical anomalies in lavas (e.g., Harper and Jacobsen 1996; Jacobsen et al. 2008; Mukhopadhyay 2012; Jackson et al. 2017).
Harper and Jacobsen (1996) suggested that the best explanation for the high abundance of 3He isotopes in the deep mantle is that 0.8 \(M\)Earth accreted within the presence of a solar nebular-composition atmosphere, which indicates a fast accretion of the early Earth. Such a scenario would be in agreement with the constrains obtained by the atmospheric Ar and Ne noble gas ratios (Lammer et al. 2020b), the Hf-W chronometer (Kleine and Walker 2017, and references therein), and the Ca isotope systematics (Schiller et al. 2018), if proto Earth grew within the disk (≈3.3–4.5 Myr; Bollard et al. 2017; Wang et al. 2017) to a mass of ≈0.53–0.58 \(M\)Earth, and to ≈0.8 \(M\)Earth immediately after disk dispersal, whilst the growing body was surrounded by the escaping H2-He-dominated primordial envelope (see Fig. 5).
Besides 3He, there is also an evidence of solar-like Ne isotopes in the deep mantle (e.g., Mizuno et al. 1980; Honda et al. 1991; Porcelli et al. 2001; Yokochi and Marty 2004; Jacobsen et al. 2008; Raquin and Moreira 2009; Jaupart et al. 2017; Péron et al. 2016). Williams and Mukhopadhyay (2019) measured a 20Ne/22Ne isotope ratio from Earth’s deep interior of 13.01–13.45, which is higher than a ratio of 12.52–12.75 that could also be produced through implantation of the solar wind onto accreted meteoritic material (Moreira et al. 2013; Moreira and Charnoz 2016). This range is well in accordance with the 20Ne/22Ne isotope ratio of ≈13.34 of the solar nebula that was derived by Heber et al. (2012) from Genesis data. In agreement with the hypothesis of Harper and Jacobsen (1996) and Jacobsen et al. (2008), Williams and Mukhopadhyay (2019) suggest that some Ne isotopes that were embedded in a primordial atmosphere were incorporated with the solar ratio into proto-Earth’s interior via a magma ocean. Jacobsen et al. (2008) also argued that solar wind related implanted components would most likely be thoroughly outgassed and lost from early differentiated planetesimals due to the before mentioned 26Al heating (Lichtenberg et al. 2016, 2018), which comports with the results of recent studies such as Young et al. (2019), Sossi et al. (2019), Benedikt et al. (2020) and Lammer et al. (2020b).
Slower accretion scenarios with proto-Earth accreting <0.53 \(M\)Earth during the disk lifetime of 3.3–4.5 Myr (Bollard et al. 2017; Wang et al. 2017) would need planetary embryos that were extremely depleted in volatile and moderately volatile rock-forming elements (i.e. K, Na, Si, Mg, etc.) after the disk evaporated and other explanations than a primordial atmospheric origin for the high 3He abundance in the deep mantle would have to be found.
3.2.5 Constraining Early Earth’s Accretion from D/H
If proto-Earth grew partly within the gas disk then one can argue that there should be visible evidence in the D/H ratio of Earth’s ocean water (e.g. Morbidelli et al. 2000; Meech and Raymond 2019; and references therein; Raymond and Morbidelli 2020), since the D/H ratio of nebular gas of \((21 \pm 5)\) × 10−6 is roughly 7 times lower (Geiss and Gloeckler 1998; Robert et al. 2012) than Earth’s seawater D/H ratio of (\(150 \pm 10\)) × 10−6 (e.g., Robert et al. 2012), which fits well within the measured D/H ratio in carbonaceous chondrites (e.g., Marty 2012). According to Ikoma and Genda (2006) and Ikoma et al. (2018), the atmospheric H2 within the primordial H2-dominated atmosphere can be oxidized by gas-rock interactions between the atmosphere and a magmatic surface with temperatures ≥1500 K, thereby producing H2O. The amount of nebular-related water depends both on the mass of the surrounding primordial atmosphere and on the available ion oxides and fayalite (Fe2SiO4) in the magma ocean. The ratios of produced water to the primordial atmospheric hydrogen \(M\)H2O/\(M\)H2 are ≈0.49, ≈24.02, and ≈0.88 for the quarz-iron-fayalite-oxygen (\(2\mathrm{Fe} + \mathrm{SiO}_{2} + \mathrm{O}_{2} \leftrightarrow \mathrm{Fe}_{2}\mathrm{SiO}_{4}\)), the wüstite-magnetite (\(6.696\mathrm{Fe}_{0.974}\mathrm{O} + \mathrm{O}_{2} \leftrightarrow 2.174\mathrm{Fe}_{3}\mathrm{O}_{4}\)), and the ion-wüstite (1.894Fe + O\(_{2}\ \leftrightarrow \) 2Fe0.947O) buffers (Robie et al. 1978; Ikoma and Genda 2006). Ikoma and Genda (2006) estimated that under such conditions a protoplanet that captured an H2-envelope from the disk gas with a mass of \(M\)H2 ≈1022 kg (0.00167 \(M\)Earth) would produce an H2O amount comparable to the mass of the Earth’s current ocean of \(M\)H2O \(\approx 1.4 \times 10^{21}\text{ g}\) if such oxygen buffers were available.
By applying the same assumption as Ikoma and Genda (2006) for an accretion scenario that can reproduce the present day atmospheric Ar and Ne isotope ratios based on the simulations of Lammer et al. (2020a), a proto-Earth with a mass of 0.55 \(M\)Earth (see also Fig. 5) with a captured primordial H-dominated atmosphere of roughly \(M\)H2 ≈3.5 × 10\(^{-5}\ M\)Earth (or 2.15 × 1020 kg) produces a water reservoir of \(M\)H2O of ≈3.0 × 1019 g from the H2-envelope corresponding to only ≈2% of the current value of Earth’s seawater (see Fig. 6). Such a low value lies within the error bars of the D/H seawater-carbonaceous chondrite “match” which is ≈10–20% (Pahlevan et al. 2019; and references therein).
If we estimate the hypothetical H2O production with similar assumptions as before but for a proto-Earth with a mass of 0.75 \(M\)Earth at the disk dispersal time of 4 Myr, an H2-envelope of 0.0077 \(M\)Earth (\(4.59 \times 10^{22}\) kg) would be captured (Lammer et al. 2020b). In such a case, roughly 4.5 times of Earth’s present seawater value, or some 4.5 Earth-oceans, could have been produced due to the nebula gas-magma ocean interaction processes. One can see from Fig. 6, that proto-Earth masses >0.6 \(M\)Earth should have left behind D/H ratios that would differ largely from the measured carbonaceous chondritic value.
Another indication that at least a small fraction of Earth’s H2O may be derived from a nebular origin comes from measurements of the D/H ratios in glassy melt inclusions in two basaltic rock samples that originated in a deep mantle reservoir by Hallis et al. (2015). These authors found D/H ratios in their samples that are closer to the nebular than to the carbonaceous chondritic ratio.
However, the contribution of other minor bodies could have also altered the initial D/H ratio of the Earth. Comets have D/H ratios that are on average significantly higher than the terrestrial value (e.g., Alexander et al. 2018); while the Earth has a D/H ratio of (\(150 \pm 10\)) × 10−6 (e.g., Robert et al. 2012), the value of comet 67P/Churyumov-Gerasimenko is three times higher (\((530 \pm 10) \times 10^{-6}\); Altwegg et al. 2015). Based on the D/H ratio of 67P/Churyumov-Gerasimenko, Marty et al. (2016) estimated a cometary contribution to the Earth’s water reservoir of only ≤1%. Higher contributions would have significantly altered the present-day value if one assumes a predominantly carbonaceous chondritic origin. Ordinary (OC) chondrites, on the other hand, also show a twice as high D/H ratio compared to the Earth ((310 ± 10) × 10−6; Alexander et al. 2012). Both chondrite types, ordinary and carbonaceous, but in addition also enstatite chondrites, have their origin from different parent bodies, mainly stemming from the main asteroid belt (e.g., Alexander et al. 2018). If one would assume a larger contribution of ordinary chondrites to the building blocks of the Earth (e.g., Dauphas 2017), or even of comets, the Earth’s D/H ratio might potentially also be reproduced by a stronger contribution of disk gas accreted water to counterbalance the higher D/H ratios of these minor bodies. However, this must then also be in-line with other volatile elements such as C, N, and noble gases.
According to the reproduction attempts of Venus’ atmospheric Ar, Ne and bulk K/U ratios (Lammer et al. 2020a, this journal; 2020b), more nebula-based water could have been produced compared to early Earth’s expected evolution as shown in the blue area of Fig. 6 due to proto-Venus possibly being slightly more massive. This would indicate that Venus’ initial D/H ratio was probably closer to the nebula ratio than to carbonaceous chondrites. Since the planet’s initial water inventory and its D/H ratio was modified during the planets evolution by thermal escape and various nonthermal atmospheric loss processes as well as water vapor outgassing episodes (see Lammer et al. 2020a, this journal) it is difficult to draw definite conclusions. New future in-situ measurements of Venus atmospheric D/H ratio in combination with heavier noble gas isotopes as discussed in Dandouras et al. (2020; this journal) are essential for constraining and understanding the evolution of early Venus’ water inventory and atmosphere.
One should also note that the production of nebula-based water depends on the nebula properties such as the dust grain depletion factor, etc. (Lammer et al. 2014; Kimura and Ikoma 2020), which can be different on other star systems. Recently, Kimura and Ikoma (2020) showed that primordial atmospheres could be highly enriched in water vapor if one does not assume solar abundances for the gas disk properties.
3.3 Protoplanetary Masses of Venus, Earth and Mars at Disk Dispersal Time Constrained from Different Isotope Reproduction Studies
If we summarize the different discussed isotope-systematics that are related to D/H, primordial 3He, 36Ar/38Ar, 20Ne/22Ne, 36Ar/22Ne, 48Ca/44Ca abundances and ratios, and chronometric methods based on 182Hf-182W and U-P isotopes one obtains the accretion scenarios for early Earth illustrated in Fig. 7.
The min. and max. disk lifetime according to Bollard et al. (2017) and Wang et al. (2017) is represented by the two vertical dashed-lines. The lower horizontal dashed-line corresponds to the minimum proto-Earth-mass, which is necessary for a protoplanet at 1 AU to build-up and keep an H2-He-dominated primordial atmosphere (Lammer et al. 2020b) from the solar nebula for some while. The blueish shaded area above the mass fraction of proto-Earth corresponds to masses for which primordial atmospheres remain too long around the growing planetary nucleus for a distance of 1 AU (Sasaki and Nakazawa 1990; Lammer et al. 2020a, this journal; 2020b). As discussed in Sect. 3.2.4, there is an excess of 3He in the deep mantle, which is two orders of magnitude higher than the 3He amount that was delivered by planetesimals and dust. Because it is expected that this 3He excess originated most likely due to ingassing (equilibration with a global magma ocean) from a primordial H2-He-dominated atmosphere (e.g., Harper and Jacobsen 1996; Jacobsen et al. 2008; Jackson et al. 2017; Timmerman et al. 2019), one can use this primordial 3He evidence for constraining the minimum proto-Earth-mass at the disk dispersal time, in agreement with the reproduced atmospheric 36Ar/38Ar, 20Ne/22Ne, 36Ar/22Ne, noble gas ratios (see Sect. 3.2.3, Lammer et al. 2020a; this journal; 2020b) of 0.53 \(M\)Earth.
The upper mass of proto-Earth at the disk dispersal time can be constrained with the D/H ratio of Earth’s seawater in agreement with the reproduction of the atmospheric Ar and Ne isotope ratios (see Sect. 3.2.3; Lammer et al. 2020a; this journal; 2020b) and recent pebble accretion model results of Johansen et al. (2020) of \(0.5 < M \leq 0.6~M_{\mathrm{Earth}}\).
As discussed in Sect. 3.2.5, higher proto-Earth-masses would have resulted in too massive H2-He-dominated primordial envelopes that would have produced a too high amount of ocean water through the reaction between the primordial atmospheric hydrogen and oxides in the magma ocean (Ikoma and Genda 2006). Such a mixture of water from nebular and carbonaceous chondritic origin would have resulted in different D/H ratios than measured in Earth’s seawater, which is close to the D/H value measured in carbonaceous chondrites (e.g., Marty 2012). The dark grey box that is confined between proto-Earth masses of ≈0.53–0.6 \(M\)Earth, and the min and max disk dispersal time of 3.3 and 4.5 Myr, therefore, corresponds to the range to which the accreting proto-Earth should have evolved to produce the preserved isotope records. The dotted-vertical line marks the time when the primordial atmosphere was lost (Lammer et al. 2020a).
In case proto-Earth accreted very fast (dotted brownish line), almost to its whole mass within 6–7 Myr. Schiller et al. (2018) inferred it from Ca-isotope systematics (see Sect. 3.2.2), then the disk lifetime should have been close to its minimum value. At this time, the luminosity of the young Sun was yet higher so that a slightly denser primordial atmosphere could have been lost from a more massive proto-Earth of 0.6 \(M\)Earth at the time of disk dispersal. A continuous fast growth until about 7 Myr after the origin of the Solar System combined with the escaping primordial atmosphere can reproduce the present atmospheric Ar and Ne isotope ratios including 36Ar/22Ne (see Lammer et al. 2020a for details).
The solid and dashed brownish lines correspond to the dual or two stage accretion scenarios as proposed by Yu and Jacobsen (2011) and Dauphas (2003). Both scenarios can also produce the studied isotope record. Most of the recent studies that used the Hf-W-chronometry method for dating the core formation expect a complete equilibrium or nearly complete equilibrium of metal and silicates favouring Hf/W values between 10–20, thereby indicating a fast accretion of ≥0.8 \(M\)Earth before ≤30 Myr (Rudge et al. 2010; Kleine et al. 2002; Yin and Jacobsen 2006; Yu and Jacobsen 2011; Kleine and Walker 2017; and references therein). There are difficulties to homogenise isotopic data related to the composition of Earth’s accreted material between the measurements of lithophile, and moderately and highly siderophile elements (Dauphas 2017) and \(\mu {}^{48}\)Ca (Schiller et al. 2018).
From this discussion, one can see that the initial setup of planets that may later evolve to an Earth-like habitat is a complex interplay between the lifetime of the gas-disk, the accretion rate of the terrestrial planet and the EUV evolution path of its young host star. If the Solar System disk lifetime had been about 8 Myr instead of ≈4 Myr (Bollard et al. 2017; Wang et al. 2017), Earth would have accreted too much primordial atmospheric mass within the protoplanetary nebula and would have ended as a small sub-Neptune or an ocean planet surrounded by a remnant of its primordial atmosphere that could not escape during its lifetime.
Due to insufficient noble gas isotope data, at present one cannot conclude much about the main composition of proto-Venus. If, however, proto-Venus accumulated a primordial atmosphere, it should have finished its accretion slightly faster than proto-Earth and did not grow further due to a lack of planetary embryos/accreting material at 0.7 AU, while early Earth at 1 AU could have still accreted about 0.4 \(M\)Earth after the disk dispersal (Lammer et al. 2020a; this journal; 2020b).
In the case of early Mars, according to Hf-W chronometry (Dauphas and Pourmand 2011; Kleine and Walker 2017), this small planet also accreted most of its mass (>0.63–1.0 \(M\)Mars) during the disk phase, but proto-Mars was too small to capture a tiny primordial atmosphere that remained around its rocky nucleus after the dissipation of the disk (Lammer et al. 2018).
Out of the formation hypotheses and model results that are compared in Table 1 of Sect. 2, currently the most likely ones to have formed terrestrial planets are pebble accretion (Johansen and Lambrechts 2017) and some Grand Tack models (Brasser et al. 2016); they come the closest to the accretion of planetary embryos with masses of ≈0.5\(M\)Earth after a few Myr. Planetesimals grow into large planetary embryos, even giant cores, or gas giants by accreting planetesimals or pebbles, or most likely a combination of both (Lambrechts et al. 2019). One should note that model simulations of planetesimal accretion struggle to grow giant massive planetary cores within the disk lifetime of 3–5 Myr (e.g., Levison et al. 2015a, 2015b). Such fast accretion scenarios may be solved by pebble accretion, but key aspects of pebble accretion remain to be better understood (Lambrechts and Johansen 2012; Johansen et al. 2015; Johansen and Lambrechts 2017; Birnstiel et al. 2016; Bitsch et al. 2019).
According to studies of Johansen et al. (2015), recent simulations indicate that the main growth of planetesimals results from the gas drag-assisted accretion of chondrules. Thus, chondrules represent the building blocks of planetesimals, planetary embryos, protoplanets and finally, terrestrial planets (e.g., Lambrechts and Johansen 2012; Johansen et al. 2015; Birnstiel et al. 2016; Johansen and Lambrechts 2017; Alexander 2019a, 2019b). It is expected that these scenarios evolve from a two-stage process, where the first generation of accreting bodies form very fast by streaming instabilities followed by continuous growth that is dominated by the gas-drag in combination with the accretion of mm-sized particles for planetesimals with radii larger than about 200 km (Johansen et al. 2015). The streaming instability most likely represents a promising mechanism that can explain how dust particles grow to 100 km large planetesimals. The streaming instability, however, requires specific conditions to operate and this implies that planetesimals may form in preferential locations, just beyond the snow line (Izidoro and Raymond 2018). However, at present knowledge, pebble accretion and streaming instabilities most likely solve the first stages in planet accretion (Fig. 1: I and II), as it results in the fast formation of Mars-sized embryos and even more massive protoplanets ≥0.5 \(M\)Earth over typical disk lifetimes of 3–5 Myr. The later stage of accretion (Fig. 1: III, IV) of the terrestrial planet structure of the inner Solar System can then be quite well explained by the Grand-Tack model and to some extent by the annulus and depleted disk models as well. A clear future step in terrestrial planet formation will be an N-body simulation that also includes the reproduction of isotopic and geochemical constraints.
4 Conclusions
We reviewed the classical scenarios of terrestrial planet formation, including the Grand-Tack model and more recently proposed alternatives. The terrestrial planet formation models were compared with accretion time scales obtained from isotope data of planetary building blocks, the atmospheric Ar and Ne isotope data of Earth and Venus, Earth’s D/H isotope ratio in the sea water and the evidence of 3H abundance in the deep mantle, as well as 182Hf-182W chronometry. The analysis of these data indicate that the early terrestrial planets in the Solar System could have accreted most of their mass (≥0.8 \(M\)Earth) within the first 10–30 Myr, including a Moon-forming event related to Earth ≥50 Myr after the Solar System originated. From the combined evidence of the atmospheric 36Ar/38Ar, 20Ne/22Ne, 36Ar/22Ne isotope ratios, the D/H ratio in Earth’s seawater and the estimated 3He abundance that likely originated due to ingassing from a primordial atmosphere, one finds that proto-Earth accreted a mass of 0.5–0.6 \(M\)Earth at ≈4 Myr, the time when the disk dissipated. The planetesimals grow into planetary embryos and or protoplanets by accreting pebbles, planetesimals, or a combination of both. Pebble accretion most likely solves time scale conflicts of fast accretion, although some aspects of pebble accretion remain to be better understood. For instance, more observations of the radial dependence of pebble sizes in disks, coagulation models that include volatiles, and experiments on the sticking properties of aggregates of a range of compositions are necessary. The late stage accretion of terrestrial planets can than explain the structure of the inner Solar System. Here, the Grand Tack model, the primordial low-mass asteroid belt, and the primordial empty asteroid belt models yield quite accurate results. More studies are needed to homogenise pebble accretion and later stage accretion models with data that are provided by chemical, chronological, isotopical and dynamical constraints. Furthermore, precise measurements of the isotopic composition of Venus are necessary for testing the planet’s evolution, including the isotopic composition of its building blocks.
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Acknowledgements
R. B. acknowledges financial assistance from the Japan Society for the Promotion of Science (JSPS) Shingakujutsu Kobo (JP19H05071). A.J. acknowledges funding from the European Research Foundation (ERC Consolidator Grant 724687-PLANETESYS), the Knut and Alice Wallenberg Foundation (Wallenberg Academy Fellow Grant 2017.0287) and the Swedish Research Council (Project Grant 2018-04867). H.L. and M.S. acknowledge the support of Europlanet 2020 RI. Europlanet 2020 RI has received funding from the European Union’s Horizon 2020 research and innovation programme under grant agreement No 654208. We thank Nathan Kaib and Matt Clement for information regarding their ‘Early instability’ model. H. L. and M. S. acknowledge support from the FWF NFN subproject S11607-N16. M. L. acknowledge support of the Austrian FWF projects P27256-N27 and P30949-N36. The authors also thank the International Space Science Institute (ISSI) in Bern, Switzerland for the support. Finally, we thank the referee S. B. Jacobsen and an anonymous referee for their very helpful comments and suggestions that helped to improve this review article.
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Reading Terrestrial Planet Evolution in Isotopes and Element Measurements
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Lammer, H., Brasser, R., Johansen, A. et al. Formation of Venus, Earth and Mars: Constrained by Isotopes. Space Sci Rev 217, 7 (2021). https://doi.org/10.1007/s11214-020-00778-4
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DOI: https://doi.org/10.1007/s11214-020-00778-4