Exponential bounds for gradient of solutions to linear elliptic and parabolic equations

Abstract

In this paper, we prove global gradient estimates for solutions to linear elliptic and parabolic equations. For a sufficiently smooth bounded convex domain ⊂ RN, we show that a solution φ ∈ W01,∞() to an appropriate elliptic equation L φ = F, with F ∈ L∞(;R), satisfies |∇ φ|∞ ≤ C |F|∞, with a positive constant C = (C(L)diam()). We also obtain similiar estimates in the parabolic setting. The proof of these exponential bounds relies on global gradient estimates inspired by a series of papers by Ben Andrews and Julie Clutterbuck. This work is motivated by a dual version of the Landis conjecture.