On the sharp Hölder exponent in the De Giorgi--Nash--Moser theory

Abstract

We consider solutions of uniformly elliptic equations with measurable coefficients. We assume that the lowest eigenvalue of the coefficient matrix is at least K-1 and the largest eigenvalue is at most K. In three and higher dimensions we construct α-Hölder continuous solutions with α= (- cn K). This disproves a long-standing conjecture by showing that, except for the two-dimensional case, the Hölder exponent obtained from the Bombieri--Giusti Harnack inequality has the optimal dependence on the ellipticity constant K.