Geometric property of the Ground State Eigenfunction for Cauchy Process

Abstract

We consider the asymptotic behavior of nonlinear nonlocal flows ut+(-)1/2u=0 to find the geometric property of the solutions in nonlinear eigenvalue problem: (-)1/2=λ posed in a strictly convex domain ⊂n with >0 in and =0 on n. This is corresponding to an eigenvalue problem for Cauchy process. The concavity of is well known for the dimension n=1. In this paper, we will show -2n+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.