Counterexamples to the comparison principle in the special Lagrangian potential equation

Abstract

For each k = 0,…,n we construct a continuous phase fk, with fk(0) = (n-2k)π2, and viscosity sub- and supersolutions vk, uk, of the elliptic PDE Σi=1n (λi(D2 w)) = fk(x) such that vk-uk has an isolated maximum at the origin. It has been an open question whether the comparison principle would hold in this second order equation for arbitrary continuous phases f (-nπ/2,nπ/2). Our examples show it does not.