The Dirichlet problem of the homogeneous k-Hessian equation in a punctured domain

Abstract

In this paper, we consider the Dirichlet problem for the homogeneous k-Hessian equation with prescribed asymptotic behavior at 0∈ where is a (k-1)-convex bounded domain in the Euclidean space. The prescribed asymptotic behavior at 0 of the solution is zero if k>n2, it is |x|+O(1) if k=n2 and -|x|2k-nn+O(1) if k<n2. To solve this problem, we consider the Dirichlet problem of the approximating k-Hessian equation in Br(0) with r small. We firstly construct the subsolution of the approximating k-Hessian equation. Then we derive the pointwise C2-estimates of the approximating equation based on new gradient and second order estimates established previously by the second author and the third author. In addition, we prove a uniform positive lower bound of the gradient if the domain is starshaped with respect to 0. As an application, we prove an identity along the level set of the approximating solution and obtain a nearly monotonicity formula. In particular, we get a weighted geometric inequality for smoothly and strictly (k-1)-convex starshaped closed hypersurface in Rn with n2 k<n.