On independent domination in direct products
Abstract
In nr-1996 Nowakowski and Rall listed a series of conjectures involving several different graph products. In particular, they conjectured that i(G× H) i(G)i(H) where i(G) is the independent domination number of G and G× H is the direct product of graphs G and H. We show this conjecture is false, and, in fact, construct pairs of graphs for which \i(G), i(H)\ - i(G× H) is arbitrarily large. We also give the exact value of i(G× Kn) when G is either a path or a cycle.
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