Universal moduli of continuity for solutions to fully nonlinear elliptic equations

Abstract

This paper provides universal, optimal moduli of continuity for viscosity solutions to fully nonlinear elliptic equations F(X, D2u) = f(X), based on weakest integrability properties of f in different scenarios. The primary result established in this work is a sharp Log-Lipschitz estimate on u based on the Ln norm of f, which corresponds to optimal regularity bounds for the critical threshold case. Optimal C1,α regularity estimates are delivered when f∈ Ln+ε. The limiting upper borderline case, f∈ L∞, also has transcendental importance to elliptic regularity theory and its applications. In this paper we show, under convexity assumption on F, that u ∈ C1,Log-Lip, provided f has bounded mean oscillation. Once more, such an estimate is optimal. For the lower borderline integrability condition allowed by the theory, we establish interior a priori estimates on the C0,n-2εn-ε norm of u based on the Ln-ε norm of f, where ε is the Escauriaza universal constant. The exponent n-2εn-ε is optimal. When the source function f lies in Lq, n > q > n-ε, we also obtain the exact, improved sharp H\"older exponent of continuity.