On the maximum partial-dual genus of a planar graph

Abstract

Let G be an embedded graph and A an edge subset of G. The partial dual of G with respect to A, denoted by GA, can be viewed as the geometric dual G* of G over A. If A=E(G), then GA=G*. Denote by γ(GA) the genus of the embedded graph GA. The maximum partial-dual genus of G is defined as ∂γM(G):=A ⊂eq E(G)γ(GA). For any planar graph G, it had been proved that ∂γM(G) does not rely on the embeddings of G. In this paper, we further prove that if G is a connected planar graph of order n≥ 2, then ∂γM(G)≥ n-n2-2n12+1, where ni is the number of vertices of degree i in G. As a consequence, if G is a connected planar graph of order n with minimum degree at least 3, then ∂γM(G) ≥ n2+1. Denote by Gc the complement of a graph G and by (Gc) the chromatic number of Gc. Moreover, we prove that if G K4 is a λ-edge-connected planar graph of order n, then ∂γM(G) ≥ f(n,λ,(Gc)), where f(n,λ,(Gc)) is a function of n, λ and (Gc). The first lower bound is tight for any n, and the second lower bound is tight for some 3-edge-connected graphs.

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