Abstract
In a previous paper (Mowshowitz, 1968), a measureI g (X) of the structural information content of an (undirected) graphX was defined, and its properties explored. The class of graphs on whichI g is defined is here enlarged to included directed graphs (digraphs). Most of the properties ofI g observed in the undirected case are seen to hold for digraphs. The greater generality of digraphs allows for a construction which shows that there exists a digraph having information content equal to the entropy of an arbitrary partition of a given positive integer.
The measureI g is also extended to a measure defined on infinite (undirected) graphs. The properties of this extension are discussed, and its applicability to the problem of measuring the complexity of algorithms is considered.
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Literature
Harary, F. 1959. “On the Group of the Composition of two Graphs.”Duke Math. Jour.,26, 29–34.
—, R. Z. Norman and D. Cartwright. 1965.Structural Models. New York: John Wiley and Sons.
Mowshowitz, A. 1968. “Entropy and the Complexity of Graphs: I. An Index of the Relative Complexity of a Graph.”Bull. Math. Biophysics,30, 175–204.
Sabidussi, G. 1959. “The Composition of Graphs.”Duke Math. Jour.,26, 693–696.
— 1960. “Graph Multiplication.”Math. Zeitschrift,72, 446–457.
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Mowshowitz, A. Entropy and the complexity of graphs: II. The information content of digraphs and infinite graphs. Bulletin of Mathematical Biophysics 30, 225–240 (1968). https://doi.org/10.1007/BF02476692
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DOI: https://doi.org/10.1007/BF02476692