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Complex Analysis and Operator Theory - Birkhauser Verlag Basel | 2024 Impact Factor:0.8 | Cite Score:1.2 | Q2

Complex Analysis and Operator Theory Journal

Impact Factor and Journal Rank of Complex Analysis and Operator Theory

  • About: Complex Analysis and Operator Theory is a peer-reviewed journal that publishes original research articles, survey papers, and reviews focusing on topics at the intersection of complex analysis and operator theory. It provides a platform for researchers and mathematicians to contribute to the theoretical foundations and applications of these disciplines.
  • Objective:
    The primary objective of Complex Analysis and Operator Theory is to advance the understanding of complex analysis and operator theory and their applications in mathematics and related fields. The journal aims to publish high-quality research that explores new theoretical insights, develops novel methodologies, and applies these theories to solve mathematical problems.
  • Interdisciplinary Approach:
    Complex Analysis and Operator Theory often adopts an interdisciplinary approach, welcoming contributions that connect complex analysis and operator theory with areas such as functional analysis, harmonic analysis, mathematical physics, and numerical analysis. This interdisciplinary perspective allows researchers to explore connections between different mathematical disciplines and their applications.
  • Impact:
    The impact of Complex Analysis and Operator Theory lies in its contributions to advancing mathematical knowledge and fostering collaborations among mathematicians worldwide. By publishing innovative research, the journal influences the development of new mathematical theories, methods, and applications in various scientific and engineering disciplines.
  • Significance:
    For mathematicians, researchers, and academics interested in complex analysis and operator theory, Complex Analysis and Operator Theory provides a valuable platform for accessing state-of-the-art research, exploring new mathematical concepts, and applying them to real-world problems. Its publications support advancements in areas such as spectral theory, operator algebras, complex geometry, and functional equations.

  • Editor-in-Chief:  Daniel Alpay

  • Scope: The Complex Analysis and Operator Theory journal (CAOT) is dedicated to publishing research that intersects complex analysis with operator theory, offering deep insights into both areas and their applications. Here is an overview of its scope and the topics covered:
  • Complex Analysis:
    Research on classical complex analysis, including complex functions, harmonic and subharmonic functions, analytic functions, entire functions, meromorphic functions, and special functions.
    Topics in geometric function theory, such as quasiconformal mappings, Teichmüller theory, and geometric properties of analytic functions.
    Complex dynamics, including iteration theory, Julia sets, rational maps, and transcendental dynamics.
    Applications of complex analysis in mathematical physics, number theory, and other disciplines.
  • Operator Theory:
    Functional analysis and operator algebras, including bounded and unbounded operators, spectral theory, C*-algebras, von Neumann algebras, and Banach algebras.
    Operator inequalities, operator equations, and operator semigroups.
    Non-commutative geometry and applications of operator theory in quantum mechanics and mathematical physics.
  • Intersections and Applications:
    Research at the interface of complex analysis and operator theory, including topics like Toeplitz operators, Bergman spaces, Hardy spaces, interpolation theory, and function spaces.
    Applications in mathematical engineering, signal processing, control theory, and other applied sciences.
  • Mathematical Physics:
    Complex variables and their applications in theoretical physics, quantum field theory, and statistical mechanics.
    Operator theory applications in quantum information theory, quantum computing, and quantum measurement theory.
  • Latest Research Topics for PhD in Computer Science

  • Print ISSN:  1661-8254

    Electronic ISSN:  1661-8262

  • Abstracting and Indexing:  Scopus, Science Citation Index Expanded

  • Imapct Factor 2024:  0.8

  • Subject Area and Category:   Computer Science, Computational Theory and Mathematics, Mathematics, Applied Mathematics, Computational Mathematics

  • Publication Frequency:  

  • H Index:  30

  • Best Quartile:

    Q1:  

    Q2:  Applied Mathematics

    Q3:  

    Q4:  

  • Cite Score:  1.2

  • SNIP:  1.152

  • Journal Rank(SJR):  0.545