Linearity of homogeneous solutions to degenerate elliptic equations in dimension three

Abstract

Given a linear elliptic equation Σ aij uij =0 in R3, it is a classical problem to determine if its degree-one homogeneous solutions u are linear. The answer is negative in general, by a construction of Martinez-Maure. In contrast, the answer is affirmative in the uniformly elliptic case, by a theorem of Han, Nadirashvili and Yuan, and it is a known open problem to determine the degenerate ellipticity condition on (aij) under which this theorem still holds. In this paper we solve this problem. We prove the linearity of u under the following degenerate ellipticity condition for (aij), which is sharp by Martinez-Maure example: if K denotes the ratio between the largest and smallest eigenvalues of (aij), we assume K|O lies in L loc1 for some connected open set O⊂ S2 that intersects any configuration of four disjoint closed geodesic arcs of length π in S2. Our results also give the sharpest possible version under which an old conjecture by Alexandrov, Koutroufiotis and Nirenberg (disproved by Martinez-Maure's example) holds.