Simplicity of extremal eigenvalues of the Klein-Gordon equation

CHRISTIANE TRETTER; Cycon H. L.; Demuth M.; Duffin R. J.; Kato T.; Kreĭn M. G.; Kreĭn M. G.; Kreĭn M. G.; Langer H.; Langer M.; MARIO KOPPEN; MONIKA WINKLMEIER; Reed M.; Reed M.; Reed M.; Rozenblum G.; Shkalikov A. A.; Simon B.; Weder R.

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Simplicity of extremal eigenvalues of the Klein-Gordon equation

Authors: CHRISTIANE TRETTER
Cycon H. L.
Demuth M.
Duffin R. J.
Kato T.
Kreĭn M. G.
Kreĭn M. G.
Kreĭn M. G.
Langer H.
Langer M.
MARIO KOPPEN
MONIKA WINKLMEIER
Reed M.
Reed M.
Reed M.
Rozenblum G.
Shkalikov A. A.
Simon B.
Weder R.
Publication date: 14 August 2010
Publisher: 'World Scientific Pub Co Pte Lt'
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Abstract

We consider the spectral problem associated with the Klein-Gordon equation for unbounded electric potentials. If the spectrum of this problem is contained in two disjoint real intervals and the two inner boundary points are eigenvalues, we show that these extremal eigenvalues are simple and possess strictly positive eigenfunctions. Examples of electric potentials satisfying these assumptions are given

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