Maximising Neumann eigenvalues on rectangles

Michiel van den Berg; Dorin Bucur; Katie Gittins

doi:10.1112/blms/bdw049

Maximising Neumann eigenvalues on rectangles

Spectral Theory 2018-05-16 v4

Authors: Michiel van den Berg , Dorin Bucur , Katie Gittins

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Abstract

We obtain results for the spectral optimisation of Neumann eigenvalues on rectangles in $\mathbb{R}^2$ with a measure or perimeter constraint. We show that the rectangle with measure $1$ which maximises the $k$ 'th Neumann eigenvalue converges to the unit square in the Hausdorff metric as $k\rightarrow \infty$ . Furthermore, we determine the unique maximiser of the $k$ 'th Neumann eigenvalue on a rectangle with given perimeter.

Maximising Neumann eigenvalues on rectangles

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