Characterization of Compact Sets in the Complex Plane with Specific Boundary Conditions and an Application to the Spectrum of Operators Verifying Isometric Conditions

Abstract

This paper delves into the investigation of compact sets within the complex plane under a boundary constraint. Specifically, we focus on scenarios where a compact set $A$ is enclosed by a curve $\partial A$ that lies within the boundary of the augmented unit disk $\partial \mathbb{D}$, including the origin. The main goal is to establish a theorem that characterizes the possible configurations of such sets. By interweaving the principles of topology and operator theory, this study not only enhances our comprehension of compact sets under specialized boundary conditions but also underscores a practical implication in the realm of operator theory. This connection is particularly evident in the examination of the spectrum of operators that meet specific isometric conditions.

Key words: Compact sets, complex plane, boundary constraints, unit disk, spectrum of isometric operators.

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Article Information

Title	Characterization of Compact Sets in the Complex Plane with Specific Boundary Conditions and an Application to the Spectrum of Operators Verifying Isometric Conditions
Source	Methods Funct. Anal. Topology, Vol. 30 (2024), no. 3-4, 105-107
DOI	10.31392/MFAT-npu26_3-4.2024.02
Copyright	The Author(s) 2024 (CC BY-SA)

Authors Information

Mohamed Amine Aouichaoui
Department of Mathematics, University of Monastir, Faculty of Sciences of Monastir, Monastir, 5019, Tunisia

Citation Example

Mohamed Amine Aouichaoui, Characterization of Compact Sets in the Complex Plane with Specific Boundary Conditions and an Application to the Spectrum of Operators Verifying Isometric Conditions, Methods Funct. Anal. Topology 30 (2024), no. 3, 105-107.

BibTex

@article {MFAT2088,
    AUTHOR = {Mohamed Amine Aouichaoui},
     TITLE = {Characterization of Compact Sets in the Complex Plane with Specific Boundary Conditions and an Application to the Spectrum of Operators Verifying Isometric Conditions},
   JOURNAL = {Methods Funct. Anal. Topology},
  FJOURNAL = {Methods of Functional Analysis and Topology},
    VOLUME = {30},
      YEAR = {2024},
    NUMBER = {3},
     PAGES = {105-107},
      ISSN = {1029-3531},
       DOI = {10.31392/MFAT-npu26_3-4.2024.02},
       URL = {https://mfat.imath.kiev.ua/article/?id=2088},
}

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