Transactions on Combinatorics University of Isfahan Journal Impact Factor

Transactions on Combinatorics - University of Isfahan | 2024 Cite Score:1.1 | Q4

Transactions on Combinatorics Journal With Cite Score

Cite Score and Journal Rank of Transactions on Combinatorics

About: Transactions on Combinatorics (TOC) is a peer-reviewed academic journal dedicated to the field of combinatorics. The journal focuses on publishing high-quality research on various aspects of combinatorial mathematics, including theoretical advancements and practical applications.
Objective: The primary objective of Transactions on Combinatorics is to advance the field of combinatorics by providing a platform for researchers to present their findings on a wide range of combinatorial topics. The journal publishes papers on combinatorial theory, algorithms, graph theory, design theory, combinatorial optimization, and related areas. It aims to foster communication and collaboration within the combinatorial research community and to promote the development of new theories and applications.
Interdisciplinary Approach: The journal embraces an interdisciplinary approach by integrating research from various fields that intersect with combinatorics. This includes contributions from mathematics, computer science, operations research, and engineering. By bridging these disciplines, the journal facilitates a comprehensive exploration of how combinatorial techniques and theories can be applied to solve complex problems in diverse areas. Contributions that offer novel insights or combine methods from different disciplines are particularly encouraged.
Impact and Significance: Transactions on Combinatorics has a significant impact on both the academic and practical aspects of combinatorial mathematics. The research published in the journal provides valuable insights into fundamental combinatorial problems and their solutions, helping to advance the field and address complex challenges. It serves as an important resource for researchers, educators, and practitioners who are engaged in combinatorial studies and applications.

Journal Home: Journal Homepage

Editor-in-Chief: Alireza Abdollahi

Scope: The Transactions on Combinatorics Journal focuses on research in combinatorics, a branch of mathematics concerning the study of finite or countable discrete structures. Its scope includes:
1. Combinatorial Theory: Research on fundamental combinatorial structures and principles, including graphs, matroids, and combinatorial designs.
2. Graph Theory: Studies on properties and applications of graphs, including graph coloring, connectivity, and graph algorithms.
3. Combinatorial Optimization: Exploration of optimization problems and techniques in combinatorics, including integer programming, network flows, and optimization algorithms.
4. Enumerative Combinatorics: Research on counting problems and techniques, including generating functions, combinatorial identities, and asymptotic analysis.
5. Extremal Combinatorics: Studies on extremal problems in combinatorics, including TurÃ¡ns theorem, Ramsey theory, and extremal graph theory.
6. Combinatorial Designs: Research on combinatorial designs, including block designs, error-correcting codes, and experimental designs.
7. Algebraic Combinatorics: Exploration of the connections between combinatorics and algebra, including algebraic structures, polynomials, and group theory.
8. Probabilistic Combinatorics: Research on probabilistic methods and techniques in combinatorics, including random graphs, random structures, and probabilistic analysis.
9. Combinatorial Geometry: Studies on geometric problems and structures in combinatorics, including arrangements of geometric objects, convexity, and geometric algorithms.
10. Combinatorial Algorithms: Research on algorithms for solving combinatorial problems, including algorithmic design, analysis, and computational complexity.
11. Combinatorial Number Theory: Exploration of combinatorial aspects of number theory, including additive number theory, partition theory, and multiplicative combinatorics.
12. Combinatorial Game Theory: Research on combinatorial games and strategies, including game theory concepts, combinatorial games, and winning strategies.
13. Applications of Combinatorics: Studies on practical applications of combinatorial methods, including applications in computer science, operations research, and engineering.
14. Discrete Mathematics: Research on discrete mathematical structures and techniques related to combinatorics, including discrete probability, combinatorial logic, and discrete geometry.
15. Computational Combinatorics: Exploration of computational aspects of combinatorics, including algorithmic problems, computational complexity, and implementation issues.