Uniform stability of the ball with respect to the first Dirichlet and Neumann ∞-eigenvalues

Abstract

In this note we analyze how perturbations of a ball Br ⊂ Rn behaves in terms of their first (non-trivial) Neumann and Dirichlet ∞-eigenvalues when a volume constraint \Ln() = Ln(Br) is imposed. Our main result states that is uniformly close to a ball when it has first Neumann and Dirichlet eigenvalues close to the ones for the ball of the same volume Br. In fact, we show that, if |λ1,∞D() - λ1,∞D(Br)| = δ1 and |λ1,∞N() - λ1,∞N(Br)| = δ2, then there are two balls such that Brδ1 r+1 ⊂ ⊂ Br+δ2 r1-δ2 r. In addition, we also obtain a result concerning stability of the Dirichlet ∞-eigen-functions.