On the first eigenvalue of the Laplacian for polygons

Abstract

In 1947, P\'olya proved that if n=3,4 the regular polygon Pn minimizes the principal frequency of an n-gon with given area α>0 and suggested that the same holds when n 5. In 1951, P\'olya & Szeg\"o discussed the possibility of counterexamples in the book "Isoperimetric Inequalities In Mathematical Physics." This paper constructs explicit (2n-4)--dimensional polygonal manifolds M(n, α) and proves the existence of a computable N 5 such that for all n N, the admissible n-gons are given via M(n, α) and there exists an explicit set An(α) ⊂ M(n,α) such that Pn has the smallest principal frequency among n-gons in An(α). Inter-alia when n 3, a formula is proved for the principal frequency of a convex P ∈ M(n,α) in terms of an equilateral n-gon with the same area; and, the set of equilateral polygons is proved to be an (n-3)--dimensional submanifold of the (2n-4)--dimensional manifold M(n,α) near Pn. If n=3, the formula completely addresses a 2006 conjecture of Antunes and Freitas and another problem mentioned in "Isoperimetric Inequalities In Mathematical Physics." Moreover, a solution to the sharp polygonal Faber-Krahn stability problem for triangles is given and with an explicit constant. The techniques involve a partial symmetrization, tensor calculus, the spectral theory of circulant matrices, and W2,p/BMO estimates. Last, an application is given in the context of electron bubbles.