English

A spectral characterization and an approximation scheme for the Hessian eigenvalue

Analysis of PDEs 2021-09-28 v3 Numerical Analysis Numerical Analysis

Abstract

We revisit the kk-Hessian eigenvalue problem on a smooth, bounded, (k1)(k-1)-convex domain in Rn\mathbb R^n. First, we obtain a spectral characterization of the kk-Hessian eigenvalue as the infimum of the first eigenvalues of linear second-order elliptic operators whose coefficients belong to the dual of the corresponding G\r{a}rding cone. Second, we introduce a non-degenerate inverse iterative scheme to solve the eigenvalue problem for the kk-Hessian operator. We show that the scheme converges, with a rate, to the kk-Hessian eigenvalue for all kk. When 2kn2\leq k\leq n, we also prove a local L1L^1 convergence of the Hessian of solutions of the scheme. Hyperbolic polynomials play an important role in our analysis.

Keywords

Cite

@article{arxiv.2012.07670,
  title  = {A spectral characterization and an approximation scheme for the Hessian eigenvalue},
  author = {Nam Q. Le},
  journal= {arXiv preprint arXiv:2012.07670},
  year   = {2021}
}

Comments

v3: final version incorporating suggestions from the referee reports; to be published in Rev. Mat. Iberoam. This paper supersedes arXiv:2006.06564

R2 v1 2026-06-23T20:57:29.936Z