Oriented Discrepancy of The Square of Hamilton Cycles

Abstract

For an oriented graph G, the oriented discrepancy problem concerns the existence of a spanning subgraph of G with a large imbalance between its forward and backward edge orientations. Freschi and Lo proved the Dirac-type Hamilton cycle result in oriented graphs, and asked for an analogue for powers of Hamilton cycles under a minimum-degree condition. We show that, for sufficiently large n, every oriented graph G on n vertices with minimum degree δ(G)≥ 2n/3 contains the square of a Hamilton cycle H with σ(H) guaranteed to exceed a function depending on δ(G) and n.