The sharp diagonal spectral correlation inequality on the discrete cube
Abstract
We prove the sharp diagonal spectral correlation conjecture of Friedgut, Kahn, Kalai and Keller, proposed in their Fourier-analytic approach to Chv\'atal's conjecture. For every pair of increasing Boolean functions , Thus covariance controls the degree-weighted collision of the two nonconstant Fourier spectra, giving a sharp Fourier strengthening of the Harris--Kleitman inequality. The theorem also implies the unweighted diagonal conjecture of Friedgut--Kahn--Kalai--Keller for an increasing family and a maximal intersecting family. The factor is optimal, and we determine all equality cases. Apart from pairs whose relevant coordinate sets are disjoint, equality occurs only for a common dictatorship and, up to relabelling coordinates and interchanging and , for the two-coordinate AND-OR pair The main novelty is a correlated four-restriction induction and a sharp endpoint convolution inequality. The usual two-restriction induction behind Harris--Kleitman sees only the parallel restricted pairs and loses the mixed Fourier information needed to control the degree-weighted diagonal spectral energy. We instead couple the four codimension-one restricted pairs with correlation ; this precise correlation extracts the missing degree-weighted energy as a nonnegative square.
Cite
@article{arxiv.2606.32024,
title = {The sharp diagonal spectral correlation inequality on the discrete cube},
author = {Fan Chang and Hong Liu and Miao Liu},
journal= {arXiv preprint arXiv:2606.32024},
year = {2026}
}
Comments
16 pages, comments welcome!