Spectral Estimates for Resolvent Differences of Self-Adjoint Elliptic Operators

Jussi Behrndt; Matthias Langer; Vladimir Lotoreichik

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Spectral Estimates for Resolvent Differences of Self-Adjoint Elliptic Operators

机译：自伴椭圆算子分辨力的谱估计

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摘要

The concept of quasi boundary triples and Weyl functions from extension theory of symmetric operators in Hilbert spaces is developed further and spectral estimates for resolvent differences of two self-adjoint extensions in terms of general operator ideals are proved. The abstract results are applied to self-adjoint realizations of second order elliptic differential operators on bounded and exterior domains, and partial differential operators with δ-potentials supported on hypersurfaces are studied.

机译：进一步发展了希尔伯特空间中对称算子扩展理论的准边界三元组和Weyl函数的概念，并证明了根据一般算子理想性确定的两个自伴扩展的分辨差的谱估计。将抽象结果应用于有界和外域上的二阶椭圆微分算子的自伴随实现，并研究了在超曲面上具有δ势的偏微分算子。

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来源
《Integral Equations and Operator Theory》 |2013年第1期|1-37|共37页
作者
Jussi Behrndt; Matthias Langer; Vladimir Lotoreichik;
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作者单位

Technische Universität Graz Institut für Numerische Mathematik">(1);

Department of Mathematics and Statistics University of Strathclyde">(2);

Technische Universität Graz Institut für Numerische Mathematik">(1);

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原文格式 PDF
正文语种 eng
中图分类
关键词
Elliptic operator; self-adjoint extension; operator ideal; δ-potential; quasi boundary triple; Weyl function;

机译：椭圆运算符;自伴扩展操作员理想;δ电位准边界三重韦尔函数;

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专利

1. Spectral Estimates for Resolvent Differences of Self-Adjoint Elliptic Operators [J] . Behrndt J., Langer M., Lotoreichik V. Integral equations and operator theory . 2013,第1期

机译：自伴椭圆算子分辨力的谱估计
2. Trace formulae and singular values of resolvent power differences of self-adjoint elliptic operators [J] . Jussi Behrndt, Vladimir Lotoreichik, Matthias Langer The Journal of the London Mathematical Society . 2013,第2期

机译：自伴椭圆算子的分辨力差的跟踪公式和奇异值
3. Krein's resolvent formula for self-adjoint extensions of symmetric second-order elliptic differential operators [J] . Posilicano A, Raimondi L Journal of physics, A. Mathematical and theoretical . 2009,第1期

机译：对称二阶椭圆微分算子的自伴随扩展的Krein分解公式
4. Variational approach to solution of nonlinear vector spectral problem for the case of self-adjoint positively semi-defined operators [C] . Savenko, P.O., Protsakh, . 2003

机译：自伴正半定义算子的非线性矢量谱问题的变分解法
5. Resolvent Estimates and Semigroup Expansions for Non-self-adjoint Schrodinger Operators [D] . Bellis, Ben 2018

机译：非自伴薛定inger算子的溶剂估计和半群展开
6. On the Spectral Representation of Ordinary Self-Adjoint Differential Operators [O] . E. A. Coddington 1952

机译：普通自伴微分算子的谱表示
7. Spectral estimates for resolvent differences of self-adjoint elliptic operators [O] . Behrndt, Jussi, Langer, Matthias, Lotoreichik, Vladimir 2013

机译：自伴椭圆算子分辨差异的谱估计
8. Resolvent Estimates of Elliptic Differential and Finite Element Operators in Pairs of Function Spaces;Research rept [R] . Bakaev, N. Y. 2002

机译：函数空间对中椭圆微分和有限元算子的预估估计;研究进展

Spectral Estimates for Resolvent Differences of Self-Adjoint Elliptic Operators

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