Minimum principles and a priori estimates for 2-Hessian problems

Abstract

In this paper we investigate a class of 2-Hessian equations and establish a minimum principle for a P-function in the sense of L.E. Payne (see R. Sperb Sp81). The analysis is based on a sharp matrix inequality providing an estimate for a suitable combination of second-order partial derivatives of the solution. Exploiting this estimate, we derive a differential inequality for the associated P-function and obtain a minimum principle in higher dimensions under a convexity assumption. As an application of our results, together with convexity results established in X.-N. Ma and L. Xu MX08, P. Liu, X.-N. Ma and L. Xu LMX10, P. Salani Sa12, and Y. Ye Ye13, we derive a priori bounds for solutions of several classical 2-Hessian boundary value problems.

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