Hadwiger Number and the Cartesian Product Of Graphs
Abstract
The Hadwiger number mr(G) of a graph G is the largest integer n for which the complete graph Kn on n vertices is a minor of G. Hadwiger conjectured that for every graph G, mr(G) >= chi(G), where chi(G) is the chromatic number of G. In this paper, we study the Hadwiger number of the Cartesian product G [] H of graphs. As the main result of this paper, we prove that mr(G1 [] G2) >= hl(1 - o(1)) for any two graphs G1 and G2 with mr(G1) = h and mr(G2) = l. We show that the above lower bound is asymptotically best possible. This asymptotically settles a question of Z. Miller (1978). As consequences of our main result, we show the following: 1. Let G be a connected graph. Let the (unique) prime factorization of G be given by G1 [] G2 [] ... [] Gk. Then G satisfies Hadwiger's conjecture if k >= 2.log(log(chi(G))) + c', where c' is a constant. This improves the 2.log(chi(G))+3 bound of Chandran and Sivadasan. 2. Let G1 and G2 be two graphs such that chi(G1) >= chi(G2) >= c.log1.5(chi(G1)), where c is a constant. Then G1 [] G2 satisfies Hadwiger's conjecture. 3. Hadwiger's conjecture is true for Gd (Cartesian product of G taken d times) for every graph G and every d >= 2. This settles a question by Chandran and Sivadasan (They had shown that the Hadiwger's conjecture is true for Gd if d >= 3.)
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