A problem of Erdos and Hajnal on paths with equal-degree endpoints

Abstract

We address a problem posed by Erdos and Hajnal in 1991, proving that for all n ≥ 600, every (2n+1)-vertex graph with at least n2 + n + 1 edges contains two vertices of equal degree connected by a path of length three. The complete bipartite graph Kn,n+1 demonstrates that this edge bound is sharp. We further establish an analogous result for graphs with even order and investigate several related extremal problems.

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