On the Dirichlet problem for the degenerate k-Hessian equation
Abstract
This paper investigates the existence of a global C1,1 solution to the Dirichlet problem for the k-Hessian equation with a nonnegative right-hand side f, focusing on the required conditions for f. The conditions f1/(k-1)∈ C1,1(0) and f3/(2k-2)∈ C2,1(0), together with f≥0 in a domain 0, are optimal, as demonstrated by classical counterexamples. For the Monge-Amp\`ere equation (k=n), we establish the existence under the optimal condition f3/(2n-2)∈ C2,1(0) together with f≥0 in 0. For the general k-Hessian equation, we establish the existence under the condition f≥0 in 0 together with one of the following three conditions: align* &(1) f1/(k-1)∈ C1,1(0),\ \ ∈f u≥1,\ \ 2≤ k≤ n-1;\\ &(2) f3/(2k-2)∈ C2,1(0),\ \ ∈f u≥1,\ \ 5≤ k≤ n-1;\\ &(3) f3/(2k)∈ C2,1(0),\ \ 2≤ k≤ n-1. align*
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