Harnack inequality for non-uniformly elliptic equations in non-divergence form

Abstract

We study regularity properties for solutions to the nakedly degenerate elliptic equation aij∂iju =0, where the coefficients satisfy I aij(x) λ(x) I and the only assumption is that λ-1 ∈ Lp. We prove an improvement of oscillation and a Liouville theorem for p>d-1, and a Harnack inequality for p sufficiently large depending on dimension. Along the way, we obtain a new -L Weak Harnack inequality for supersolutions. Then, touching subsolutions by double exponential blow-up barriers, we also derive a logarithmic local maximum principle that is new even in the uniformly elliptic case. Both of these results hold for p>d-1. Finally, we construct examples showing that there cannot be Harnack or Weak Harnack inequalities in the regime p<d-1, nor can there be power-type L inequalities in the case of any p<∞.