Optimal domains for the Cheeger inequality

Abstract

In this paper we consider the scale invariant shape functional Fp,q()=λp1/p()λq1/q(), where 1 q<p+∞ and λp() (respectively λq()) is the first eigenvalue of the p-Laplacian -p (respectively -q) with Dirichlet boundary condition on ∂. We study both the maximization and minimization problems for Fp,q, and show the existence of optimal domains in Rd, along with some of their qualitative properties. Surprisingly, the case of a bounded box D constraint \λq()\ :\ ⊂ D,\ λp()=1\, leads to a problem of different nature, for which the existence of a solution is shown by analyzing optimal capacitary measures. In the last section we list some interesting questions that, in our opinion, deserve to be investigated.

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