Critical points of solutions to a quasilinear elliptic equation with nonhomogeneous Dirichlet boundary conditions

Abstract

In this paper, we mainly investigate the critical points associated to solutions u of a quasilinear elliptic equation with nonhomogeneous Dirichlet boundary conditions in a connected domain in R2. Based on the fine analysis about the distribution of connected components of a super-level set \x∈ : u(x)>t\ for any ∂u(x)<t< ∂u(x), we obtain the geometric structure of interior critical points of u. Precisely, when is simply connected, we develop a new method to prove i = 1k mi+1=N, where m1,·s,mk are the respective multiplicities of interior critical points x1,·s,xk of u and N is the number of global maximal points of u on ∂. When is an annular domain with the interior boundary γI and the external boundary γE, where u|γI=H,~u|γE=(x) and (x) has N local (global) maximal points on γE. For the case (x)≥ H or (x)≤ H or γE(x)<H< γE(x), we show that i = 1k mi N (either i = 1k mi=N or i = 1k mi+1=N).