An Ore-type Theorem for Oriented Discrepancy of Hamilton Cycles
Abstract
Oriented graph discrepancy problems focus on finding specific subgraphs within a given oriented graph G that contain a significant number of edges in one direction. This concept was first introduced by Gishboliner, Krivelevich, and Michaeli, and has since been further investigated by Freschi and Lo [J. Combin. Theory, Ser. B 169 (2024)], who gave a tight lower bound for the discrepancy of Hamilton cycles in terms of the minimum degree of G. Furthermore, they raised the problem of extending such results to Ore-type conditions. Here, an Ore-type condition refers to the minimum degree-sum of non-adjacent vertices, formally defined as: σ2(G)=\d(x)+d(y) x, y ∈ V(G) and xy E(G)\. In this paper, we address this question by showing that for every sufficiently large oriented graph G, if σ2(G)≥ n, then G contains a Hamilton cycle C with at least \n/2,σ2(G)/2-o(n)\ edges in one direction. Moreover, this result is asymptotically tight.
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