English

Geometric property of the Ground State Eigenfunction for Cauchy Process

Analysis of PDEs 2013-04-12 v4

Abstract

We consider the asymptotic behavior of nonlinear nonlocal flows ut+(\La)1/2u=0u_t+(-\La)^{1/2}u=0 to find the geometric property of the solutions in nonlinear eigenvalue problem: (-\La)^{1/2}\vp=\lambda\vp posed in a strictly convex domain ΩRn\Omega\subset\R^n with \vp>0\vp>0 in Ω\Omega and \vp=0\vp=0 on Rn\bsΩ\R^n\bs\Omega. This is corresponding to an eigenvalue problem for Cauchy process. The concavity of \vp\vp is well known for the dimension n=1n=1. In this paper, we will show \vp2n+1\vp^{-\frac{2}{n+1}} is convex. Moreover, the eventual power-convexity of the parabolic flows is also proved. In the final section, We extend geometric results to Cauchy problem for the fractional Heat operator.

Keywords

Cite

@article{arxiv.1105.3283,
  title  = {Geometric property of the Ground State Eigenfunction for Cauchy Process},
  author = {Sunghoon Kim and Ki-Ahm Lee},
  journal= {arXiv preprint arXiv:1105.3283},
  year   = {2013}
}

Comments

25 pages. This paper has been withdrawn by the author. The reason is as follows. We've checked our paper for the purpose of reviewing our work. Unfortunately, we find that the proof for the main result is not perfect, i.e., there are some gaps and mistakes

R2 v1 2026-06-21T18:08:20.265Z