论文信息 - Semigroups and the Generalized Road Coloring Problem

Semigroups and the Generalized Road Coloring Problem

AbstractThe road coloring problem has been open for some 25 years. This paper shows how algebraic methods, specifically semigroup theory, can be used to both generalize and shed light on the problem. Given a strongly connected digraph, the notion of a coloring semigroup is defined. The main result shows that the existence of a coloring semigroup whose kernel is a minimum rank right group of rank t implies the digraph is periodic of order t.

Greg Budzban | G. Budzban

[1] Benjamin Weiss,et al. Equivalence of topological Markov shifts , 1977 .

[2] G. Högnäs. Random semigroup acts on a finite set , 1977, Journal of the Australian Mathematical Society.

[3] Arunava Mukherjea,et al. Probability Measures on Semigroups: Convolution Products, Random Walks and Random Matrices , 1995 .

[4] Bolyai János Matematikai Társulat,et al. Algebraic theory of semigroups , 1979 .

[5] Mario Petrich,et al. Introduction to semigroups , 1973 .

[6] W. D. Munn,et al. The Algebraic Theory of Semigroups, Vol. I , 1964, The Mathematical Gazette.

[7] Alessandra Carbone. Cycles of relatively prime length and the road coloring problem , 2001 .

[8] W. Clark. Remarks on the kernel of a matrix semigroup , 1965 .

[9] Semigroups of finite matrices , 1994 .