The first Grushin eigenvalue on cartesian product domains

Abstract

In this paper we consider the first eigenvalue λ1() of the Grushin operator G:=x1+|x1|2sx2 with Dirichlet boundary conditions on a bounded domain of Rd= Rd1+d2. We prove that λ1() admits a unique minimizer in the class of domains with prescribed finite volume which are the cartesian product of a set in Rd1 and a set in Rd2, and that the minimizer is the product of two balls *1 ⊂eq Rd1 and 2* ⊂eq Rd2. Moreover, we provide a lower bound for |*1| and for λ1(1*×2*). Finally, we consider the limiting problem as s tends to 0 and to +∞.