Non-negative perturbations of non-negative self-adjoint operators

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Abstract

Let $A$ be a non-negative self-adjoint operator in a Hilbert space $\mathcal{H}$ and $A_{0}$ be some densely defined closed restriction of $A_{0}$, $A_{0}\subseteq A eq A_{0}$. It is of interest to know whether $A$ is the unique non-negative self-adjoint extensions of $A_{0}$ in $\mathcal{H}$. We give a natural criterion that this is the case and if it fails, we describe all non-negative extensions of $A_{0}$. The obtained results are applied to investigation of non-negative singular point perturbations of the Laplace and poly-harmonic operators in $\mathbb{L}_{2}(\mathbf{R}_{n})$.

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Published

2007-06-25

Issue

Vol. 13 No. 2 (2007)

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Articles

How to Cite

Adamyan, V. M. “Non-Negative Perturbations of Non-Negative Self-Adjoint Operators”. Methods of Functional Analysis and Topology, vol. 13, no. 2, June 2007, pp. 103-9, https://zen.imath.kiev.ua/index.php/mfat/article/view/342.