An improved upper bound for the bondage number of graphs on surfaces

Abstract

The bondage number b(G) of a graph G is the smallest number of edges whose removal from G results in a graph with larger domination number. Recently Gagarin and Zverovich showed that, for a graph G with maximum degree (G) and embeddable on an orientable surface of genus h and a non-orientable surface of genus k, b(G)≤\(G)+h+2,+k+1\. They also gave examples showing that adjustments of their proofs implicitly provide better results for larger values of h and k. In this paper we establish an improved explicit upper bound for b(G), using the Euler characteristic instead of the genera h and k, with the relations =2-2h and =2-k. We show that b(G)≤(G)+ r for the case ≤0 (i.e. h≥1 or k≥2), where r is the largest real root of the cubic equation z3+2z2+(6-7)z+18-24=0. Our proof is based on the technique developed by Carlson-Develin and Gagarin-Zverovich, and includes some elementary calculus as a new ingredient. We also find an asymptotically equivalent result b(G)≤(G)+12-6\,-1/2 for ≤0, and a further improvement for graphs with large girth.