Operator Theory and Its Applications

A special issue of Axioms (ISSN 2075-1680).

Deadline for manuscript submissions: closed (31 May 2022) | Viewed by 13981

Special Issue Editors


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Department of Mathematics, Faculty of Sciences and Mathematics, Višegradska 33, Niš, 18000, Serbia
Interests: metric space; fixed point theory; operator theory; summability and matrix transformations
Special Issues, Collections and Topics in MDPI journals

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Guest Editor
Department of Mathematics, State University Novi Pazar, Vuka Karadžića bb, Novi Pazar 36300, Serbia
Interests: metric space; operator theory; summability and matrix transformations; measures of noncompactness
Special Issues, Collections and Topics in MDPI journals

Special Issue Information

Dear Colleagues,

Functional analysis and operator theory are widely used in the description, understanding, and control of dynamical systems and natural processes in physics, chemistry, medicine, and the engineering sciences.

This Special Issue is focused on the most recent advances in operator theory for theoretical and applied sciences arising in all fields of science, engineering applications, and other applied fields. The topics of the special issue include but are not limited to:

  • Bounded and unbounded operators between Banach spaces;
  • Matrix transformations on sequence spaces;
  • Fine spectrum;
  • Essential spectrum and Fredholm theory;
  • Measures of noncompactness of operators;
  • Generalized inverses;
  • Operators in fixed point theory;
  • Perov type contractions.

Prof. Dr. Vladimir Rakocevic
Prof. Dr. Eberhard Malkowsky
Guest Editors

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Published Papers (6 papers)

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Research

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66 pages, 702 KiB  
Article
A New Survey of Measures of Noncompactness and Their Applications
by Moosa Gabeleh, Eberhard Malkowsky, Mohammad Mursaleen and Vladimir Rakočević
Axioms 2022, 11(6), 299; https://doi.org/10.3390/axioms11060299 - 20 Jun 2022
Cited by 12 | Viewed by 2939
Abstract
We present a survey of the theory of measures of noncompactness and discuss some fixed point theorems of Darbo’s type. We apply the technique of measures of noncompactness to the characterization of classes of compact operators between certain sequence spaces, in solving infinite [...] Read more.
We present a survey of the theory of measures of noncompactness and discuss some fixed point theorems of Darbo’s type. We apply the technique of measures of noncompactness to the characterization of classes of compact operators between certain sequence spaces, in solving infinite systems of integral equations in some sequence spaces. We also present some recent results related to the existence of best proximity points (pairs) for some classes of cyclic and noncyclic condensing operators in Banach spaces equipped with a suitable measure of noncompactness. Finally, we discuss the existence of an optimal solution for systems of integro–differentials. Full article
(This article belongs to the Special Issue Operator Theory and Its Applications)
9 pages, 274 KiB  
Article
The Space of Functions with Tempered Increments on a Locally Compact and Countable at Infinity Metric Space
by Józef Banaś and Rafał Nalepa
Axioms 2022, 11(1), 11; https://doi.org/10.3390/axioms11010011 - 25 Dec 2021
Viewed by 2399
Abstract
The aim of the paper is to introduce the Banach space consisting of real functions defined on a locally compact and countable at infinity metric space and having increments tempered by a modulus of continuity. We are going to provide a condition that [...] Read more.
The aim of the paper is to introduce the Banach space consisting of real functions defined on a locally compact and countable at infinity metric space and having increments tempered by a modulus of continuity. We are going to provide a condition that is sufficient for the relative compactness in the Banach space in question. A few particular cases of that Banach space will be discussed. Full article
(This article belongs to the Special Issue Operator Theory and Its Applications)
14 pages, 314 KiB  
Article
Structure of Iso-Symmetric Operators
by Bhagwati Prashad Duggal and In-Hyoun Kim
Axioms 2021, 10(4), 256; https://doi.org/10.3390/axioms10040256 - 14 Oct 2021
Cited by 3 | Viewed by 2009
Abstract
For a Hilbert space operator TB(H), let LT and RTB(B(H)) denote, respectively, the operators of left multiplication and right multiplication by T. For positive integers m [...] Read more.
For a Hilbert space operator TB(H), let LT and RTB(B(H)) denote, respectively, the operators of left multiplication and right multiplication by T. For positive integers m and n, let T,Tm(I)=(LTRTI)m(I) and δT,Tn(I)=(LTRT)m(I). The operator T is said to be (m,n)-isosymmetric if T,TmδT,Tn(I)=0. Power bounded (m,n)-isosymmetric operators TB(H) have an upper triangular matrix representation T=T1T30T2B(H1H2) such that T1B(H1) is a C0.-operator which satisfies δT1,T1n(I|H1)=0 and T2B(H2) is a C1.-operator which satisfies AT2=(VuVb)|H2A, A=limtT2tT2t, Vu is a unitary and Vb is a bilateral shift. If, in particular, T is cohyponormal, then T is the direct sum of a unitary with a C00-contraction. Full article
(This article belongs to the Special Issue Operator Theory and Its Applications)
12 pages, 326 KiB  
Article
Calculations on Matrix Transformations Involving an Infinite Tridiagonal Matrix
by Ali Fares, Ali Ayad and Bruno de Malafosse
Axioms 2021, 10(3), 218; https://doi.org/10.3390/axioms10030218 - 8 Sep 2021
Viewed by 1753
Abstract
Given any sequence z=znn1 of positive real numbers and any set E of complex sequences, we write Ez for the set of all sequences y=ynn1 such that [...] Read more.
Given any sequence z=znn1 of positive real numbers and any set E of complex sequences, we write Ez for the set of all sequences y=ynn1 such that y/z=yn/znn1E; in particular, sz0 denotes the set of all sequences y such that y/z tends to zero. Here, we consider the infinite tridiagonal matrix Br,s,t˜, obtained from the triangle Br,s,t, by deleting its first row. Then we determine the sets of all positive sequences a=ann1 such that EaBr,s,t˜Ea, where E=, c0, or c. These results extend some recent results. Full article
(This article belongs to the Special Issue Operator Theory and Its Applications)
11 pages, 328 KiB  
Article
New Results on the SSIE with an Operator of the form FΔƐ + Fx Involving the Spaces of Strongly Summable and Convergent Sequences Using the Cesàro Method
by Bruno de Malafosse
Axioms 2021, 10(3), 157; https://doi.org/10.3390/axioms10030157 - 19 Jul 2021
Cited by 2 | Viewed by 1493
Abstract
Given any sequence a=(an)n1 of positive real numbers and any set E of complex sequences, we can use Ea to represent the set of all sequences [...] Read more.
Given any sequence a=(an)n1 of positive real numbers and any set E of complex sequences, we can use Ea to represent the set of all sequences y=(yn)n1 such that y/a=(yn/an)n1E. In this paper, we use the spaces w, w0 and w of strongly bounded, summable to zero and summable sequences, which are the sets of all sequences y such that n1k=1nykn is bounded and tends to zero, and such that ylew0, for some scalarl. These sets were used in the statistical convergence. Then we deal with the solvability of each of the SSIE FΔƐ+Fx, where Ɛ is a linear space of sequences, F=c0, c, , w0, w or w, and F=c0, c or . For instance, the solvability of the SSIE wΔw0+sxc relies on determining the set of all sequences x=xnn1U+ that satisfy the following statement. For every sequence y that satisfies the condition limnn1k=1nykyk1l=0, there are two sequences u and v, with y=u+v such that limnn1k=1nuk=0 and limnvn/xn=L for some scalars l and L. Full article
(This article belongs to the Special Issue Operator Theory and Its Applications)

Review

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16 pages, 334 KiB  
Review
Ideals, Nonnegative Summability Matrices and Corresponding Convergence Notions: A Short Survey of Recent Advancements
by Pratulananda Das
Axioms 2022, 11(1), 1; https://doi.org/10.3390/axioms11010001 - 21 Dec 2021
Viewed by 2117
Abstract
In this survey article, we look into some recent results concerning summability matrices, both regular as well as those which are not regular (called semi-regular) and generated matrix ideals as the overall view of the inter relationship between the notions of ideal convergence [...] Read more.
In this survey article, we look into some recent results concerning summability matrices, both regular as well as those which are not regular (called semi-regular) and generated matrix ideals as the overall view of the inter relationship between the notions of ideal convergence and summability methods by regular summability matrices. Full article
(This article belongs to the Special Issue Operator Theory and Its Applications)
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