Applied Categorical Structures - Springer Nature | 2024 Impact Factor:0.5 | Cite Score:1.1 | Q1

Impact Factor and Journal Rank of Applied Categorical Structures

• About: The Applied Categorical Structures Journal is a peer-reviewed academic journal dedicated to the study and application of category theory. It publishes high-quality research articles, reviews, and technical notes that explore the theoretical foundations, methodologies, and practical applications of categorical structures in various domains of mathematics, computer science, and beyond.
• Objective:
  The primary objective of the Applied Categorical Structures Journal is to advance the understanding and utilization of category theory by promoting research that highlights its relevance and applicability to solving complex problems. The journal aims to bridge the gap between abstract theoretical concepts and practical implementations, thereby fostering innovation and development in both pure and applied sciences.
• Interdisciplinary Approach:
  The journal adopts an interdisciplinary approach, encouraging contributions that integrate category theory with other mathematical disciplines, computer science, and engineering. By exploring the intersections of these fields, the journal promotes the development of robust and versatile methodologies that can be applied to a wide range of problems, from theoretical mathematics to practical engineering challenges.
• Impact:
  The impact of the Applied Categorical Structures Journal is evident in its role in advancing both theoretical research and practical applications of category theory. By publishing innovative studies and methodologies, the journal influences academic research, informs industry practices, and supports the development of new technologies. Its contributions help enhance the efficiency, reliability, and scalability of solutions in various scientific and engineering domains.
• Significance:
  For researchers, practitioners, and educators in category theory and its applications, the journal serves as an essential resource for accessing cutting-edge research, exploring innovative methodologies, and applying them to real-world scenarios. Its publications contribute to the development of advanced mathematical models, algorithms, and tools that enhance problem-solving capabilities and computational efficiency. The journals significance lies in its ability to promote interdisciplinary collaboration, foster a deeper understanding of categorical structures, and facilitate the transfer of knowledge between theory and practice.

• Journal Home:  Journal Homepage

• Editor-in-Chief:  Nicola Gambino

• Scope: The Applied Categorical Structures journal focuses on the application of category theory to various fields of mathematics, computer science, and related disciplines. It provides a platform for the publication of original research and survey articles that explore the role of category theory in understanding and solving complex problems.
• Category Theory:
  Advances in the foundational aspects of category theory, including functors, natural transformations, limits, colimits, adjunctions, and monads.
  Research on enriched categories, higher category theory, and topos theory.
• Algebra and Topology:
  Applications of categorical methods in algebra, including ring theory, module theory, and homological algebra.
  Use of categorical techniques in topology, such as algebraic topology, homotopy theory, and topological quantum field theory.
• Mathematical Logic:
  Studies on categorical logic, including type theory, model theory, and proof theory.
  Research on the relationship between category theory and set theory, particularly in the context of toposes and categorical set theory.
• Computer Science:
  Applications of category theory in theoretical computer science, including programming language semantics, type systems, and formal verification.
  Research on categorical methods in concurrency theory, computational effects, and functional programming.
• Quantum Computing:
  Exploration of the role of category theory in quantum computing and quantum information theory.
  Studies on categorical quantum mechanics, quantum protocols, and quantum programming languages.
• Mathematical Physics:
  Application of categorical methods in mathematical physics, including the study of symmetries, gauge theories, and string theory.
  Research on the use of category theory in the formulation of physical theories and models.
• Differential Geometry and Algebraic Geometry:
  Use of category theory in differential geometry, including the study of bundles, connections, and sheaf theory.
  Applications in algebraic geometry, such as the study of schemes, coherent sheaves, and derived categories.
• Applications in Other Sciences:
  Research on the application of categorical methods in fields such as biology, linguistics, cognitive science, and systems theory.
  Studies on the use of category theory to model and analyze complex systems and processes in various scientific disciplines.
• Latest Research Topics for PhD in Computer Science

• Print ISSN:  0927-2852

  Electronic ISSN:  1572-9095

• Abstracting and Indexing:  Scopus, Science Citation Index EXpanded

• Imapct Factor 2024:  0.5

• Subject Area and Category:   Computer Science, Computer Science (miscellaneous), Mathematics, Algebra and Number Theory, Theoretical Computer Science

• Publication Frequency:  

• H Index:  33

• Best Quartile:

  Q1:  Algebra and Number Theory

  Q2:  

  Q3:  

  Q4:  

• Cite Score:  1.1

• SNIP:  1.056

• Journal Rank(SJR):  0.730

• Latest Articles:   Latest Articles in Applied Categorical Structures

• Guidelines for Authors: Applied Categorical Structures Author Guidelines

• Paper Submissions: Paper Submissions in Applied Categorical Structures

• Publisher:  Springer Netherlands

  Country:  Netherlands

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