Title :
An algorithm for counting short cycles in bipartite graphs
Author :
Halford, Thomas R. ; Chugg, Keith M.
Author_Institution :
Commun. Sci. Inst., Univ. of Southern California, Los Angeles, CA, USA
Abstract :
Let G=(U∪W, E) be a bipartite graph with disjoint vertex sets U and W, edge set E, and girth g. This correspondence presents an algorithm for counting the number of cycles of length g, g+2, and g+4 incident upon every vertex in U∪W. The proposed cycle counting algorithm consists of integer matrix operations and its complexity grows as O(gn3) where n=max(|U|,|W|).
Keywords :
cyclic codes; graph theory; matrix algebra; parity check codes; bipartite graph; cycle counting algorithm; girth; graphical code model; integer matrix operation; Bipartite graph; Concatenated codes; Convolutional codes; Decoding; Graph theory; Graphical models; Joining processes; Parity check codes; Bipartite graphs; cycles; girth; graphical models of codes; loops;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2005.860472
