Monotonicity of the first Dirichlet eigenvalue of regular polygons
Abstract
In this paper we prove that the first Dirichlet eigenvalue λ1N of an N-sided regular polygon of fixed area is a monotonically decreasing function of N for all N ≥ 3, as well as the monotonicity of the quotients λ1Nλ1N+1. This settles a conjecture of Antunes-Freitas from 2006 [P. Antunes, P. Freitas, Experiment. Math., 15(3):333-342, 2006].
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