English

The Continuous Subsolution Problem for Complex Hessian Equations

Complex Variables 2023-02-08 v3 Analysis of PDEs Differential Geometry

Abstract

Let ΩCn\Omega \subset \mathbb C^n be a bounded strictly mm-pseudoconvex domain (1mn1\leq m\leq n) and μ\mu a positive Borel measure on Ω\Omega. We study the Dirichlet problem for the complex Hessian equation (ddcu)mβnm=μ(dd^c u)^m \wedge \beta^{n - m} = \mu on Ω\Omega. First we give a sufficient condition on the "modulus of diffusion" of the measure μ\mu with respect to the mm-Hessian capacity which guarantees the existence of a continuous solution to the associated Dirichlet problem with a continuous boundary datum. As an application, we prove that if the equation has a continuous mm-subharmonic subsolution whose modulus of continuity satisfies a Dini type condition, then the equation has a continuous solution with an arbitrary continuous boundary datum. Moreover when the measure has a finite mass on Ω\Omega, we give a precise quantitative estimate on the modulus of continuity of the solution. One of the main steps in our proof is to establish a new capacity estimate providing a precise estimate of the modulus of diffusion of the mm-Hessian measure of a continuous mm-subharmonic function φ\varphi in Ω\Omega with zero boundary with respect to the mm-Hessian capacity in terms of the modulus of continuity of φ\varphi. Another important ingredient is a new weak stability estimate for the mm-Hessian measure of a continuous mm-subharmonic function in Ω\Omega.

Keywords

Cite

@article{arxiv.2007.10194,
  title  = {The Continuous Subsolution Problem for Complex Hessian Equations},
  author = {Mohamad Charabati and Ahmed Zeriahi},
  journal= {arXiv preprint arXiv:2007.10194},
  year   = {2023}
}

Comments

This is the final version accepted for publication in IUMJ. arXiv admin note: text overlap with arXiv:2004.06952

R2 v1 2026-06-23T17:15:02.084Z