Sharp spectral Moon--Moser-type theorems in the linear range via feasible graph parameters

Abstract

Moon and Moser proved a sharp edge-extremal theorem for Hamilton cycles in balanced bipartite graphs with minimum degree at least k. Li and Ning obtained spectral analogues for Hamiltonicity in balanced bipartite graphs of order 2n and for traceability in nearly balanced bipartite graphs with part sizes n and n-1, under the assumption n (k+1)2. We show that their sharp spectral thresholds remain valid in the linear ranges n 2k and n 2k+1, respectively. More precisely, we determine the extremal values of the adjacency spectral radius and the signless Laplacian spectral radius for non-Hamiltonian balanced bipartite graphs with minimum degree δ(G) k, and for non-traceable nearly balanced bipartite graphs with δ(G) k. In each case, the extremal graph is unique up to isomorphism. Our proof is based on feasible graph parameters: parameters that increase under edge addition and are nondecreasing under Kelmans operations. This yields Moon--Moser type extremal theorems for a general class of parameters, from which the spectral results follow.

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