Singular Spectrum Near a Singular Point of Friedrichs Model Operators of Absolute Type期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

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Singular Spectrum Near a Singular Point of Friedrichs Model Operators of Absolute Type

Authors:	Serguei I Iakovlev

Institution:	(1) Departamento de Matematicas, Universidad Simon Bolivar, Apartado Postal 89000, Caracas, 1080-A, Venezuela

Abstract:	In $L_{2} {\left( \mathbb{R} \right)}$ we consider a family of selfadjoint operators of the Friedrichs model: $A_{m} = {\left\| t \right\|}^{m} \cdot + V$ . Here ${\left\| t \right\|}^{m} \cdot$ is the operator of multiplication by the corresponding function of the independent variable $t \in \mathbb{R}$ , and (perturbation) is a trace-class integral operator with a continuous Hermitian kernel $v{\left( {t,x} \right)}$ satisfying some smoothness condition. These absolute type operators have one singular point of order . Conditions on the kernel $v{\left( {t,x} \right)}$ are found guaranteeing the absence of the point spectrum and the singular continuous one of such operators near the origin. These conditions are actually necessary and sufficient. They depend on the finiteness of the rank of a perturbation operator and on the order of singularity . The sharpness of these conditions is confirmed by counterexamples.

Keywords:	47B06 47B25
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