Dimension of the minimum set for the real and complex Monge-Amp\`ere equations in critical Sobolev spaces

Abstract

We prove that the zero set of a nonnegative plurisubharmonic function that solves (∂ ∂ u) ≥ 1 in Cn and is in W2, n(n-k)k contains no analytic sub-variety of dimension k or larger. Along the way we prove an analogous result for the real Monge-Amp\`ere equation, which is also new. These results are sharp in view of well-known examples of Pogorelov and Bocki. As an application, in the real case we extend interior regularity results to the case that u lies in a critical Sobolev space (or more generally, certain Sobolev-Orlicz spaces).