中文

Singular Perturbations of Abstract Wave equations

泛函分析 2007-05-23 v2 数学物理 math.MP

摘要

Given, on the Hilbert space \H_0, the self-adjoint operator BB and the skew-adjoint operators C1C_1 and C2C_2, we consider, on the Hilbert space \H\simeq D(B)\oplus\H_0, the skew-adjoint operator W=[C2\unoB2C1]W=[\begin{matrix} C_2&\uno -B^2&C_1\end{matrix}] corresponding to the abstract wave equation ϕ¨(C1+C2)ϕ˙=(B2+C1C2)ϕ\ddot\phi-(C_1+C_2)\dot\phi=-(B^2+C_1C_2)\phi. Given then an auxiliary Hilbert space \fh\fh and a linear map τ:D(B2)\fh\tau:D(B^2)\to\fh with a kernel \K\K dense in \H_0, we explicitly construct skew-adjoint operators WΘW_\Theta on a Hilbert space \H_\Theta\simeq D(B)\oplus\H_0\oplus \fh which coincide with WW on N\KD(B)\N\simeq\K\oplus D(B). The extension parameter Θ\Theta ranges over the set of positive, bounded and injective self-adjoint operators on \fh\fh. In the case C1=C2=0C_1=C_2=0 our construction allows a natural definition of negative (strongly) singular perturbations AΘA_\Theta of A:=B2A:=-B^2 such that the diagram WWΘAAΘ \begin{CD} W @>>> W_\Theta @AAA @VVV A@>>> A_\Theta \end{CD} is commutative.

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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