Cycles in graphs and in hypergraphs: towards homology theory
Abstract
In this expository paper we present some ideas of algebraic topology (more precisely, of homology theory) in a language accessible to non-specialists in the area. A 1-cycle in a graph is a set C of edges such that every vertex is contained in an even number of edges from C. It is easy to check that the sum (modulo 2) of 1-cycles is a 1-cycle. We start from the following problems: to find the number of all 1-cycles in a given graph; a small number of 1-cycles in a given graph such that any 1-cycle is the sum of some of them. We consider generalizations (of these problems) to graphs with symmetry, to 2-cycles in 2-dimensional hypergraphs, and to certain configuration spaces of graphs (namely, to the square and the deleted square).
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