Largest 2-regular subgraphs in 3-regular graphs
Abstract
For a graph G, let f2(G) denote the largest number of vertices in a 2-regular subgraph of G. We determine the minimum of f2(G) over 3-regular n-vertex simple graphs G. To do this, we prove that every 3-regular multigraph with exactly c cut-edges has a 2-regular subgraph that omits at most \0, (c-1)/2\ vertices. More generally, every n-vertex multigraph with maximum degree 3 and m edges has a 2-regular subgraph that omits at most \0, (3n-2m+c-1)/2\ vertices. These bounds are sharp; we describe the extremal multigraphs.
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