Helmut Linde scite author profile

Helmut Linde

4Publications

69Citation Statements Received

215Citation Statements Given

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Affiliations

Merz (Germany), Pontificia Universidad Católica de Chile, University of Stuttgart

Publications

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A second eigenvalue bound for the Dirichlet Laplacian in hyperbolic space

Benguria

Linde²

2007

Duke Math. J.

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Abstract. Let Ω be some domain in the hyperbolic space H n (with n ≥ 2) and S 1 the geodesic ball that has the same first Dirichlet eigenvalue as Ω. We prove the Payne-Pólya-Weinberger conjecture for H n , i.e., that the second Dirichlet eigenvalue on Ω is smaller or equal than the second Dirichlet eigenvalue on S 1 .We also prove that the ratio of the first two eigenvalues on geodesic balls is a decreasing function of the radius.

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Isoperimetric inequalities for eigenvalues of the Laplacian and the Schrödinger operator

2012

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A Second Eigenvalue Bound for the Dirichlet Schrödinger Operator

Benguria

Linde

2006

Commun. Math. Phys.

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Abstract. Let λ i (Ω, V ) be the ith eigenvalue of the Schrödinger operator with Dirichlet boundary conditions on a bounded domain Ω ⊂ R n and with the positive potential V . Following the spirit of the Payne-Pólya-Weinberger conjecture and under some convexity assumptions on the spherically rearranged potential V ⋆ , we prove that λ 2 (Ω, V ) ≤ λ 2 (S 1 , V ⋆ ). Here S 1 denotes the ball, centered at the origin, that satisfies the condition λ 1 (Ω, V ) = λ 1 (S 1 , V ⋆ ).Further we prove under the same convexity assumptions on a spherically symmetric potential V , that λ 2 (B R , V )/λ 1 (B R , V ) decreases when the radius R of the ball B R increases.We conclude with several results about the first two eigenvalues of the Laplace operator with respect to a measure of Gaussian or inverted Gaussian density.

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Lieb-Thirring Inequalities for Geometrically Induced Bound States

Exner

Linde

Weidl

2004

Letters in Mathematical Physics

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Helmut Linde

A second eigenvalue bound for the Dirichlet Laplacian in hyperbolic space

Isoperimetric inequalities for eigenvalues of the Laplacian and the Schrödinger operator

A Second Eigenvalue Bound for the Dirichlet Schrödinger Operator

Lieb-Thirring Inequalities for Geometrically Induced Bound States

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