A spectral condition for Hamilton cycles in tough bipartite graphs
Abstract
Let G be a graph. The spectral radius of G is the largest eigenvalue of its adjacency matrix. For a non-complete bipartite graph G with parts X and Y, the bipartite toughness of G is defined as tB(G)=\|S|c(G-S)\, where the minimum is taken over all proper subsets S⊂ X (or S⊂ Y) such that c(G-S)>1. In this paper, we give a sharp spectral radius condition for balanced bipartite graphs G with tB(G)≥1 to guarantee that G contains Hamilton cycles. This solves a problem proposed in CFL.
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