On the P\'olya conjecture for the Neumann problem in planar convex domains
Abstract
Denote by N N (,λ) the counting function of the spectrum of the Neumann problem in the domain on the plane. G. P\'olya conjectured that N N (,λ) (4π)-1 || λ. We prove that for convex domains N N (,λ) (2 3 \,j02)-1 || λ. Here j0 is the first zero of the Bessel function J0.
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