论文信息 - Semirings and path spaces

Semirings and path spaces

Abstract This paper develops a unified algebraic theory for a class of path problems such as that of finding the shortest or, more generally, the k shortest paths in a network; the enumeration of elemementary or simple paths in a graph. It differs from most earlier work in that the algebraic structure appended to a graph or a network of a path problem is not axiomatically given as a starting point of the theory, but is derived from a novel concept called a “path space”. This concept is shown to provide a coherent framework for the analysis of path problems, and hence the development of algebraic methods for solving them.

Ahnont Wongseelashote

[1] Bernard Roy,et al. Chemins et Circuits: Enumeration et Optimisation , 1975 .

[2] Bernard Giffler. Schedule algebra: A progress report , 1968 .

[3] R. Backhouse,et al. Regular Algebra Applied to Path-finding Problems , 1975 .

[4] Robert McNaughton,et al. Regular Expressions and State Graphs for Automata , 1960, IRE Trans. Electron. Comput..

[5] B. Ciffler. Scheduling general production systems using schedule algebra , 1963 .

[6] B. Carré. An Algebra for Network Routing Problems , 1971 .

[7] Douglas R. Shier,et al. Iterative methods for determining the k shortest paths in a network , 1976, Networks.

[8] Ahnont Wongseelashote,et al. An algebra for determining all path-values in a network with application to K-shortest-paths problems , 1976, Networks.

[9] E. Minieka,et al. A Note on an Algebra for the k Best Routes in a Network , 1973 .

[10] M. Gondran,et al. Algèbre linéaire et cheminement dans un graphe , 1975 .

[11] P. Macdonald. Combinatorial Programming: Methods and Applications , 1976 .