On the number of bound states for Schrödinger operators with operator-valued potentials

Dirk Hundertmark

Type: Article

Publication Date: 2002-04-01

Citations: 17

DOI: https://doi.org/10.1007/bf02384503

Abstract

Cwikel's bound is extended to an operator-valued setting. One application of this result is a semi-classical bound for the number of negative bound states for Schrödinger operators with operator-valued potentials. We recover Cwikel's bound for the Lieb-Thirring constant L0,3 which is far worse than the best available by Lieb (for scalar potentials). However, it leads to a uniform bound (in the dimension d≥3) for the quotient L0,d/Lcl0,d is the so-called classical constant. This gives some improvement in large dimensions.

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+ PDF Chat	On the Lieb-Thirring constantsL γ,1 for γ≧1/2	1996	Timo Weidl
+	Spectral Theory of Self-Adjoint Operators in Hilbert Space	1987	M. Sh. Birman M. Z. Solomjak
+	Riesz means of bound states and semiclassical limit connected with a Lieb–Thirring's conjecture	1990	Bernard Helffer Didier Robert
+	A sharp bound for an eigenvalue moment of the one-dimensional Schrödinger operator	2002	Dirk Hundertmark Élliott H. Lieb Lawrence E. Thomas
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+	On the Schr�dinger equation and the eigenvalue problem	1983	Peter Li Shing Tung Yau
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+ PDF Chat	A new proof of the Cwikel-Lieb-Rosenblijum bound	1985	Joseph G. Conlon
+	On semi-classical bounds for eigenvalues of Schrödinger operators	1978	Michael Aizenman Élliott H. Lieb
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