Simple cubic graphs with no short traveling salesman tour
Abstract
Let tsp(G) denote the length of a shortest travelling salesman tour in a graph G. We prove that for any >0, there exists a simple 2-connected planar cubic graph G1 such that tsp(G1) (1.25-)·|V(G1)|, a simple 2-connected bipartite cubic graph G2 such that tsp(G2) (1.2-)·|V(G2)|, and a simple 3-connected cubic graph G3 such that tsp(G3) (1.125-)·|V(G3)|.
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