A bound on the dissociation number
Abstract
The dissociation number diss(G) of a graph G is the maximum order of a set of vertices of G inducing a subgraph that is of maximum degree at most 1. Computing the dissociation number of a given graph is algorithmically hard even when restricted to subcubic bipartite graphs. For a graph G with n vertices, m edges, k components, and c1 induced cycles of length 1 modulo 3, we show diss(G)≥ n-13(m+k+c1). Furthermore, we characterize the extremal graphs in which every two cycles are vertex-disjoint.
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