English

The Dirichlet principle for the complex $k$-Hessian functional

Analysis of PDEs 2020-08-28 v1

Abstract

We study the variational structure of the complex kk-Hessian equation on bounded domain XCnX\subset \mathbb C^n with boundary M=XM=\partial X. We prove that the Dirichlet problem σk(ˉu)=0\sigma_k (\partial \bar{\partial} u) =0 in XX, and u=fu=f on MM is variational and we give an explicit construction of the associated functional Ek(u)\mathcal{E}_k(u). Moreover we prove Ek(u)\mathcal{E}_k(u) satisfies the Dirichlet principle. In a special case when k=2k=2, our constructed functional E2(u)\mathcal{E}_2(u) involves the Hermitian mean curvature of the boundary, the notion first introduced and studied by X. Wang. Earlier work of J. Case and and the first author of this article introduced a boundary operator for the (real) kk-Hessian functional which satisfies the Dirichlet principle. The present paper shows that there is a parallel picture in the complex setting.

Keywords

Cite

@article{arxiv.2008.12136,
  title  = {The Dirichlet principle for the complex $k$-Hessian functional},
  author = {Yi Wang and Hang Xu},
  journal= {arXiv preprint arXiv:2008.12136},
  year   = {2020}
}

Comments

arXiv admin note: text overlap with arXiv:1606.00071

R2 v1 2026-06-23T18:08:33.809Z