A Strengthened Alexandrov Maximum Principle or Uniform H\"older Continuity for Solutions of the Monge--Amp\`ere Equation with Bounded Right-Hand Side

Abstract

This article is about the convex solution u of the Monge--Amp\`ere equation on an at least 2-dimensional open bounded convex domain with Dirichlet boundary data and nonnegative bounded right-hand side. For convex functions with zero boundary data, an Alexandrov maximum principle |u(x)| ≤ C dist(x,∂)α is equivalent to (uniform) H\"older continuity with the same constant and exponent. Convex α-H\"older continuous functions are W1,p for p < 1/(1-α). We prove H\"older continuity with the exponent α=2/n for n ≥ 3 and any α ∈ (0,1) for n=2, provided that the boundary data satisfy this H\"older continuity, and show that these bounds for the exponent are sharp. The only means is to bound the Hessian determinant of a certain explicit function on an n-dimensional cylinder and to use the comparison princple.

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