Exponential localization of Steklov eigenfunctions on warped product manifolds: the flea on the elephant phenomenon

Abstract: This paper is devoted to the analysis of Steklov eigenvalues and Steklov eigenfunctions on a class of warped product Riemannian manifolds (M, g) whose boundary ∂M consists in two distinct connected components Γ 0 and Γ 1 . First, we show that the Steklov eigenvalues can be divided into two families (λ ± m ) m≥0 which satisfy accurate asymptotics as m → ∞. Second, we consider the associated Steklov eigenfunctions which are the harmonic extensions of the boundary Dirichlet to Neumann eigenfunctions. In the case … Show more