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On an open problem of Weidmann: essential spectra and square-integrable solutions

Published online by Cambridge University Press:  04 April 2011

Jiangang Qi
Affiliation:
Department of Mathematics, Shandong University at Weihai, Weihai 264209, People's Republic of [email protected]@sdu.edu.cn
Shaozhu Chen
Affiliation:
Department of Mathematics, Shandong University at Weihai, Weihai 264209, People's Republic of [email protected]@sdu.edu.cn

Abstract

In 1987, Weidmann proved that, for a symmetric differential operator τ and a real λ, if there exist fewer square-integrable solutions of (τ−λ)y = 0 than needed and if there is a self-adjoint extension of τ such that λ is not its eigenvalue, then λ belongs to the essential spectrum of τ. However, he posed an open problem of whether the second condition is necessary and it has been conjectured that the second condition can be removed. In this paper, we first set up a formula of the dimensions of null spaces for a closed symmetric operator and its closed symmetric extension at a point outside the essential spectrum. We then establish a formula of the numbers of linearly independent square-integrable solutions on the left and the right subintervals, and on the entire interval for nth-order differential operators. The latter formula ascertains the above conjecture. These results are crucial in criteria of essential spectra in terms of the numbers of square-integrable solutions for real values of the spectral parameter.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 2011

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