Viscosity solutions to complex Hessian equations

Abstract

We study viscosity solutions to complex hessian equations. In the local case, we consider a bounded domain in Cn, β the standard K\"ahler form in Cn and 1≤ m≤ n. Under some suitable conditions on F, g, we prove that the equation (ddc )mβn-m=F(x,)βn,\ =g on admits a unique viscosity solution modulo the existence of subsolution and supersolution. If moreover, the datum are H\"older continuous then so is the solution. In the global case, let (X,ω) be a compact hermitian homogeneous manifold where ω is an invariant hermitian metric (not necessarily K\"ahler). We prove that the equation (ω+ddc)mωn-m=F(x,)ωn has a unique viscosity solution under some natural conditions on F.