Powers of Hamilton cycles of high discrepancy are unavoidable

Abstract

The P\'osa-Seymour conjecture asserts that every graph on n vertices with minimum degree at least (1 - 1/(r+1))n contains the rth power of a Hamilton cycle. Koml\'os, S\'ark\"ozy and Szemer\'edi famously proved the conjecture for large n. The notion of discrepancy appears in many areas of mathematics, including graph theory. In this setting, a graph G is given along with a 2-coloring of its edges. One is then asked to find in G a copy of a given subgraph with a large discrepancy, i.e., with significantly more than half of its edges in one color. For r ≥ 2, we determine the minimum degree threshold needed to find the rth power of a Hamilton cycle of large discrepancy, answering a question posed by Balogh, Csaba, Pluh\'ar and Treglown. Notably, for r ≥ 3, this threshold approximately matches the minimum degree requirement of the P\'osa-Seymour conjecture.