Incidence-free sets and edge domination in incidence graphs
Abstract
A set of edges of a graph G is an edge dominating set if every edge of G intersects at least one edge of , and the edge domination number γe(G) is the smallest size of an edge dominating set. Expanding on work of Laskar and Wallis, we study γe(G) for graphs G which are the incidence graph of some incidence structure D, with an emphasis on the case when D is a symmetric design. In particular, we show in this latter case that determining γe(G) is equivalent to determining the largest size of certain incidence-free sets of D. Throughout, we employ a variety of combinatorial, probabilistic and geometric techniques, supplemented with tools from spectral graph theory.
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