Coloring 3-Colorable Graphs with Low Threshold Rank

Abstract

We present a new algorithm for finding large independent sets in 3-colorable graphs with small 1-sided threshold rank. Specifically, given an n-vertex 3-colorable graph whose uniform random walk matrix has at most r eigenvalues larger than , our algorithm finds a proper 3-coloring on at least (12-O())n vertices in time nO(r/2). This extends and improves upon the result of Bafna, Hsieh, and Kothari on 1-sided expanders. Furthermore, an independent work by Buhai, Hua, Steurer, and V\'ari-Kakas shows that it is UG-hard to properly 3-color more than (12+)n vertices, thus establishing the tightness of our result. Our proof is short and simple, relying on the observation that for any distribution over proper 3-colorings, the correlation across an edge must be large if the marginals of the endpoints are not concentrated on any single color. Notably, this property fails for 4-colorings, which is consistent with the hardness result of [BHK25] for 4-colorable 1-sided expanders.