Interior H\"older estimate for the linearized complex Monge-Ampere equation

Abstract

Let w0 be a bounded, C3, strictly plurisubharmonic function defined on B1⊂ Cn. Then w0 has a neighborhood in L∞(B1). Suppose that we have a function φ in this neighborhood with 1-ε MA(u) 1+ε and there exists a function u solving the linearized complex Monge-Ampere equation: det(φkl)φIjuIj=0. Then one has an estimate on |u|Cα(B12) for some α>0 depending on n, as long as ε is small depending on n. This partially generalizes Caffarelli's estimate for linearized real Monge-Ampere equation to the complex version.