Geometric Properties of Gelfand's Problems with Parabolic Approach

Abstract

We consider the asymptotic profiles of the nonlinear parabolic flows (eu)t= u+λ eu to show the geometric properties of the following elliptic nonlinear eigenvalue problems known as a Gelfand's problem: equation* split &+ λ e=0, >0 \\ &=0 split equation* posed in a strictly convex domain ⊂n. In this work, we show that there is a strictly increasing function f(s) such that f-1((x)) is convex for 0<λ≤λ, i.e., we prove that level set of is convex. Moreover, we also present the boundary condition of which guarantee the f-convexity of solution .