Journal of Combinatorial Theory. Series B - Elsevier | 2024 Impact Factor:1.2 | Cite Score:2.7 | Q1

Impact Factor and Journal Rank of Combinatorial Theory. Series B

• About: Journal of Combinatorial Theory, Series B is a prestigious peer-reviewed journal that focuses on the study of combinatorial mathematics. It is one of the leading journals in the field, publishing original research papers that contribute significantly to the theory and applications of combinatorics. The journal covers a wide range of topics within combinatorial theory, emphasizing both fundamental aspects and practical applications.
• Impact and Significance
  Journal of Combinatorial Theory, Series B is significant for several reasons:
• High-Quality Research: The journal is renowned for publishing high-quality, rigorous research papers that advance the field of combinatorics.
  Broad Coverage: It covers a wide range of topics, reflecting the diverse nature of combinatorial mathematics and its applications.
  Interdisciplinary Appeal: The journal attracts contributions from various disciplines, including mathematics, computer science, and engineering, promoting interdisciplinary research.
  Influential Articles: Many articles published in the journal have had a significant impact on the development of combinatorial theory and its applications.
  Reputation and Prestige: The journal is highly regarded in the mathematical community, known for its stringent peer-review process and commitment to excellence.
• Types of Articles Accepted
  Journal of Combinatorial Theory, Series B accepts a variety of submission types, including:
• Research Articles: Original research papers presenting new findings and advancements in combinatorial theory.
  Survey Articles: Comprehensive surveys of the current state of research on specific topics within combinatorics.
  Short Communications: Brief reports on novel findings or preliminary research in the field.
  Expository Articles: Papers that explain and synthesize existing knowledge in a clear and accessible manner.
  Methodological Papers: Articles focusing on the development and validation of new methods and techniques in combinatorial research.
  Case Studies: Studies demonstrating the application of combinatorial theory to solve real-world problems.

• Journal Home:  Journal Homepage

• Editor-in-Chief:  M. Krivelevich

• Scope: Journal of Combinatorial Theory, Series B is a peer-reviewed journal dedicated to publishing high-quality research articles in the field of combinatorial mathematics. It is known for its rigorous standards and contributions to the advancement of combinatorial theory. The journal covers a wide range of topics within combinatorial theory, including but not limited to:
• Graph Theory: Research on the properties and applications of graphs, including topics such as graph coloring, graph algorithms, and network theory.
• Matroid Theory: Studies on the structure and properties of matroids and their applications in various areas of mathematics.
• Extremal Combinatorics: Research on extremal problems in combinatorics, such as Turán-type problems, Ramsey theory, and extremal set theory.
• Combinatorial Designs: Studies on the construction and properties of combinatorial designs, including block designs, Latin squares, and finite geometries.
• Enumerative Combinatorics: Research on counting combinatorial structures, including generating functions, bijective proofs, and asymptotic enumeration.
• Probabilistic Combinatorics: Studies on the application of probabilistic methods to combinatorial problems, including random graphs and probabilistic techniques.
• Algebraic Combinatorics: Research on the interaction between combinatorics and algebra, including topics such as group actions on combinatorial structures and the combinatorial properties of polynomials.
• Combinatorial Optimization: Studies on optimization problems in combinatorics, including network flows, matching theory, and combinatorial algorithms.
• Applications of Combinatorics: Research on the application of combinatorial methods to other fields, such as computer science, biology, and physics.
• Latest Research Topics for PhD in Computer Science

• Print ISSN:  00958956

  Electronic ISSN:  10960902

• Abstracting and Indexing:  Science Citation Index Expanded, Scopus

• Imapct Factor 2024:  1.2

• Subject Area and Category:  Computer Science ,Computational Theory and Mathematics,Mathematics,Discrete Mathematics and Combinatorics,Theoretical Computer Science

• Publication Frequency:  

• H Index:  71

• Best Quartile:

  Q1:  Computational Theory and Mathematics

  Q2:  

  Q3:  

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• Cite Score:  2.7

• SNIP:  1.832

• Journal Rank(SJR):  2.312

• Latest Articles:   Latest Articles in Journal of Combinatorial Theory. Series B

• Guidelines for Authors: Journal of Combinatorial Theory. Series B Author Guidelines

• Paper Submissions: Paper Submissions in Journal of Combinatorial Theory. Series B

• Publisher:  Academic Press Inc.

  Country:  United States

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