Critical points of solutions to a kind of linear elliptic equations in multiply connected domains

Abstract

In this paper, we mainly study the critical points and critical zero points of solutions u to a kind of linear elliptic equations with nonhomogeneous Dirichlet boundary conditions in a multiply connected domain in R2. Based on the fine analysis about the distributions of connected components of the super-level sets \x∈ : u(x)>t\ and sub-level sets \x∈ : u(x)<t\ for some t, we obtain the geometric structure of interior critical point sets of u. Precisely, let be a multiply connected domain with the interior boundary γI and the external boundary γE, where u|γI=1(x),~u|γE=2(x). When 1(x) and 2(x) have N1 and N2 local maximal points on γI and γE respectively, we deduce that Σi = 1k mi≤ N1+ N2, where m1,·s,mk are the respective multiplicities of interior critical points x1,·s,xk of u. In addition, when γE2(x)≥ γI1(x) and u has only N1 and N2 equal local maxima relative to on γI and γE respectively, we develop a new method to show that one of the following three results holds Σi = 1k mi=N1+N2 or Σi = 1k mi+1=N1+N2 or Σi = 1k mi+2=N1+N2. Moreover, we investigate the geometric structure of interior critical zero points of u. We obtain that the sum of multiplicities of the interior critical zero points of u is less than or equal to the half of the number of its isolated zero points on the boundaries.