The H\"older continuous subsolution theorem for complex Hessian equations

Abstract

Let Cn be a bounded strongly m-pseudoconvex domain (1≤ m≤ n) and μ a positive Borel measure with finite mass on . Then we solve the H\"older continuous subsolution problem for the complex Hessian equation (ddc u)m βn - m = μ on . Namely, we show that this equation admits a unique H\"older continuous solution on with a given H\"older continuous boundary values if it admits a H\"older continuous subsolution on . The main step in solving the problem is to establish a new capacity estimate showing that the m-Hessian measure of a H\"older continuous m-subharmonic function on with zero boundary values is dominated by the m-Hessian capacity with respect to with an (explicit) exponent τ > 1.