Pedro Freitas scite author profile

We perform a numerical optimization of the first ten nontrivial eigenvalues of the Neumann Laplacian for planar Euclidean domains. The optimization procedure is done via a gradient method, while the computation of the eigenvalues themselves is done by means of an efficient meshless numerical method which allows for the computation of the eigenvalues for large numbers of domains within a reasonable time frame. The Dirichlet problem, previously studied by Oudet using a different numerical method, is also studied and we obtain similar (but improved) results for a larger number of eigenvalues. These results reveal an underlying structure to the optimizers regarding symmetry and connectedness, for instance, but also show that there are exceptions to these preventing general results from holding.

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Geometrically induced discrete spectrum in curved tubes

Chenaud

Duclos

Freitas³

et al. 2005

Differential Geometry and its Applications

107

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The Dirichlet Laplacian in curved tubes of arbitrary cross-section rotating w.r.t. the Tang frame along infinite curves in Euclidean spaces of arbitrary dimension is investigated. If the reference curve is not straight and its curvatures vanish at infinity, we prove that the essential spectrum as a set coincides with the spectrum of the straight tube of the same cross-section and that the discrete spectrum is not empty. MSC2000: 81Q10; 58J50; 53A04.

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The first Robin eigenvalue with negative boundary parameter

Freitas

Krejčiřı́k

2015

Advances in Mathematics

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Abstract. We give a counterexample to the long standing conjecture that the ball maximises the first eigenvalue of the Robin eigenvalue problem with negative parameter among domains of the same volume. Furthermore, we show that the conjecture holds in two dimensions provided that the boundary parameter is small. This is the first known example within the class of isoperimetric spectral problems for the first eigenvalue of the Laplacian where the ball is not an optimiser.

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Spherical symmetrization and the first eigenvalue of geodesic disks on manifolds

2013

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Optimal spectral rectangles and lattice ellipses

Antunes

Freitas

2013

Proc. R. Soc. A.

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We consider the problem of minimizing the kth eigenvalue of rectangles with unit area and Dirichlet boundary conditions. This problem corresponds to finding the ellipse centred at the origin with axes on the horizontal and vertical axes with the smallest area containing k integer lattice points in the first quadrant. We show that, as k goes to infinity, the optimal rectangle approaches the square and, correspondingly, the optimal ellipse approaches the circle. We also provide a computational method for determining optimal rectangles for any k and relate the rate of convergence to the square with the conjectured error term for Gauss's circle problem.

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Pedro Freitas

Numerical Optimization of Low Eigenvalues of the Dirichlet and Neumann Laplacians

Geometrically induced discrete spectrum in curved tubes

The first Robin eigenvalue with negative boundary parameter

Spherical symmetrization and the first eigenvalue of geodesic disks on manifolds

Optimal spectral rectangles and lattice ellipses

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