A Hexagonal Counterexample to Log-Convexity of Fisher Information Along the Heat Flow

Abstract

We construct a smooth, strictly positive, Gaussian-decaying density on R2 for which Fisher information along the heat flow is not log-convex. This disproves the Cheng--Geng log-convexity conjecture in dimension two and, by tensorization, in every dimension d2. Consequently, the multidimensional forms of the Gaussian completely monotone conjecture, McKean's conjecture, and Toscani's entropy power conjecture also fail, complementing the one-dimensional counterexample of Gu and Sellke. Our construction is a small hexagonal perturbation on the triangular torus, transferred to R2 by a Gaussian envelope and supported by explicit two-dimensional numerics. We also initiate the study of the sharp constants θd* by proving θ1*=1, establishing monotonicity in the dimension, and identifying a dichotomy for the asymptotic constant θ∞* governed by the sign of D. The explicit two-dimensional counterexample was found by GPT-5.5 Pro.