Borderline gradient continuity for degenerate/singular fully nonlinear elliptic equations with Hamiltonian terms

Abstract

This paper focuses on a class of fully nonlinear elliptic equations with general double phase degeneracy/singularity law and Hamiltonian terms of the form Φ(|Du|,x)F(D2 u, x)+H(Du,x) =f(x) in B1, where Φ takes one of two typical forms: Φ(|Du|,x)=σ1(|Du|)+a(x)σ2(|Du|) or Φ(|Du|,x)=σ1(|Du|)|Du|+a(x)σ2(|Du|)|Du|. Under suitable assumptions on the operator F, Hamiltonian term H, source term f and modulating coefficient a, we establish C1 regularity for viscosity solutions, provided that σ1,σ2 are moduli of continuity and their inverses are Dini continuous. Our argument is based on a tangential analysis via approximating hyperplanes combined with a new recursive renormalization algorithm adapted to the present framework. It is noteworthy that our results are new even for the case a(x) 0.