A Discrete Hardy-Laptev-Weidl-Type Inequality and Associated Schrödinger-Type Operators
Resumo
Although the classical Hardy inequality is valid only in the three- and higher dimensional case, Laptev and Weidl established a two-dimensional Hardy-type inequality for the magnetic gradient with an Aharonov-Bohm magnetic potential. Here we consider a discrete analogue, replacing the punctured plane with a radially exponential lattice. In addition to discrete Hardy and Sobolev inequalities, we study the spectral properties of two associated self-adjoint operators. In particular, it is shown that, for suitable potentials, the discrete Schrödingertype operator in the Aharonov-Bohm field has essential spectrum concentrated at 0, and the multiplicity of its lower spectrum satisfies a CLR-type inequality.Downloads
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Publicado
2009-03-11
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Evans W. D. . y Schmidt K. M. . (2009). A Discrete Hardy-Laptev-Weidl-Type Inequality and Associated Schrödinger-Type Operators. Revista Matemática Complutense, 22(1), 75-90. https://doi.org/10.5209/rev_REMA.2009.v22.n1.16316
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