Admissible solutions to augmented nonsymmetric k-Hessian type equations II. A priori estimates and the Dirichlet problem

Abstract

Using the established d-concavity of the k-Hessian type functions Fk(R)=(Sk(R)), whose variables are nonsymmetric matrices, we prove C2, α() estimates for strictly (δ, γk) -admissible solutions to the Dirichlet problem without the well-known regularity condition. A necessary condition for the existence of strictly δ-admissible solutions to the equations is given. By the method of continuity, we provide some sufficient conditions for the unique solvability in the class of strictly (δ,γk)-admissible solutions to the Dirichlet problem, provided that those skew-symmetric matrices in the equations are sufficiently small in some sense.