Article PDF
Avoid common mistakes on your manuscript.
References
Balota D.A., Spieler D.H. (1999) Word frequency, repetition, and lexicality effects in word recognition tasks: Beyond measures of central tendency. Journal of Experimental Psychology: General 128:32–55
Glickman M.E., Gray J.R., Morales C.J. (in press). Combining speed and accuracy to assess error-free cognitive processes. Psychometrika.
Hockley W.E. (1984) Analysis of reaction time distributions in the study of cognitive processes. Journal of Experimental Psychology: Learning, Memory, & Cognition 10:598–615
Hohle R.H. (1965) Inferred components of reaction time as a function of foreperiod duration. Journal of Experimental Psychology 69:382–386
Logan G.D. (1992) Shapes of reaction time distributions and shapes of learning curves: A test of the instance theory of automaticity. Journal of Experimental Psychology: Learning, Memory, & Cognition 18:883–914
Luce R.D. (1986) Response Times. Oxford University Press, New York
Nelder J.A., Mead R. (1965) A simplex method for function minimization. Computer Journal 7:308–313
Peruggia M., Van Zandt T., Chen M. (2002). Was it a car or a cat I saw? An analysis of response times for word recognition. Case Studies in Bayesian Statistics 7
Ratcliff R., Rouder J.N. (1998) Modeling response times for decisions between two choices. Psychological Science 9:347–356
Ratcliff R., Rouder J.N. (2000) A diffusion model analysis of letter masking. Journal of Experimental Psychology; Human Perception and Performance 26:127–140
Ratcliff R., Thapar A., McKoon G. (2001) The effect of aging on reaction time in a signal detection task. Psychology and Aging 16:323–341
Reed T.R.C., Cressie N.A.C. (1988) Goodness-of-Fit Statistics for Discrete Multivariate Data. Springer-Verlag, New York
Rouder J.N., Lu J., Speckman P.L., Sun D., Jiang Y. (in press). A hierarchical model for estimating response time distributions. Psychonomic Bulletin and Review.
Rouder J.N., Sun D., Speckman P.L., Lu J., Zhou D. (2003) A hierarchical Bayesian statistical framework for response time distributions. Psychometrika 68:587–604
Schnipke D.L., Scrams D.J. (1997) Modeling item response times with a two-state mixture model: A new method of measuring speededness. Journal of Educational Measurement 34:213–232
Wenger M.J., Gibson B.S. (2004) Assing hazard functions to assess changes in processing capacity in an attentional cuing paradigm. Journal of Experimental Psychology: Human Perception and Performance 30:708–719
Van Breukelen G.J.P. (2005) Psychometric modeling of response time and accuracy with mixed and conditional regression. Psychometrika 70, DOI: 10.1007/s11336-003-1078-0.
Author information
Authors and Affiliations
Corresponding author
Additional information
This research is supported by NSF grants SES - 0095919 and 0351523 to J. Rouder, D. Sun, and P. Speckman. Further support came from University of Missouri Research Council, Ministry of Education of Spain, and Katholieke Universiteit Leuven. I thank Francis Tuerlinckx for helpful discussions.
Rights and permissions
About this article
Cite this article
Rouder, J.N. Are unshifted distributional models appropriate for response time?. Psychometrika 70, 377–381 (2005). https://doi.org/10.1007/s11336-005-1297-7
Published:
Issue Date:
DOI: https://doi.org/10.1007/s11336-005-1297-7