On $J$-self-adjoint extensions of the Phillips symmetric operator

Authors

  • L. Vavrykovych Institute of Mathematics, National Academy of Sciences of Ukraine, 3 Tereshchenkivs'ka, Kyiv, 01601, Ukraine
  • O. Shapovalova National Pedagogical Dragomanov University, Kyiv, Ukraine
  • S. A. Kuzhel Nizhin State University, 2 Kropyv'yanskogo Str., Nizhin, 16602, Ukraine 

DOI:

Keywords:

Abstract

$J$-self-adjoint extensions of the Phillips symmetric operator $S$ are %\break studied. The concepts of stable and unstable $C$-symmetry are introduced in the extension theory framework. The main results are the following: if ${A}$ is a $J$-self-adjoint extension of $S$, then either $\sigma({A})=\mathbb{R}$ or $\sigma({A})=\mathbb{C}$; if ${A}$ has a real spectrum, then ${A}$ has a stable $C$-symmetry and ${A}$ is similar to a self-adjoint operator; there are no $J$-self-adjoint extensions of the Phillips operator with unstable $C$-symmetry.

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Published

2010-12-25

Issue

Vol. 16 No. 4 (2010)

Section

Articles

How to Cite

Vavrykovych, L., et al. “On $J$-Self-Adjoint Extensions of the Phillips Symmetric Operator”. Methods of Functional Analysis and Topology, vol. 16, no. 4, Dec. 2010, pp. 333-48, https://zen.imath.kiev.ua/index.php/mfat/article/view/461.