Isoperimetric Bounds for Weighted Steklov Eigenvalues with Radial Weights
Abstract
We study the following class of Steklov eigenvalue problems: \[ ∇ · ( w ∇ u ) = 0 in , ∂ u∂ = γ v u on ∂ , \] where w and v are prescribed positive radial functions, is a Lipschitz domain in RN with N ≥ 2 and denotes its outward unit normal. Extending classical results in the unweighted case due to Weinstock, the first author, and others, we establish isoperimetric inequalities for low-order eigenvalues under suitable symmetry assumptions on the domain. In the first part, we consider the case w(x) = |x|α and v(x) = |x|β-α, where the parameters α, β ∈ R satisfy appropriate constraints. Our analysis relies on an explicit computation of the spectrum in the radial case, variational principles, and a family of weighted isoperimetric inequalities with ``double density''. In the second part, we address the case v 1 and w(x) = W(|x|), where W is a non-decreasing, log-convex function. In this setting, the proof relies, among other tools, on a new weighted isoperimetric inequality, which may be of independent interest.
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