Singular Perturbations of Abstract Wave equations
摘要
Given, on the Hilbert space \H_0, the self-adjoint operator and the skew-adjoint operators and , we consider, on the Hilbert space \H\simeq D(B)\oplus\H_0, the skew-adjoint operator corresponding to the abstract wave equation . Given then an auxiliary Hilbert space and a linear map with a kernel dense in \H_0, we explicitly construct skew-adjoint operators on a Hilbert space \H_\Theta\simeq D(B)\oplus\H_0\oplus \fh which coincide with on . The extension parameter ranges over the set of positive, bounded and injective self-adjoint operators on . In the case our construction allows a natural definition of negative (strongly) singular perturbations of such that the diagram is commutative.
引用
@article{arxiv.math/0403386,
title = {Singular Perturbations of Abstract Wave equations},
author = {Andrea Posilicano},
journal= {arXiv preprint arXiv:math/0403386},
year = {2007}
}
备注
Revised version. Misprints corrected. New examples and a digression on a possible application to the electrodynamics of a point particle added. Accepted for publication in Journal of Functional Analysis