雜志介紹

Journal Of Knot Theory And Its Ramifications雜志介紹

《Journal Of Knot Theory And Its Ramifications》是一本以English為主的未開放獲取國際優秀期刊，中文名稱結理論雜志及其后果，本刊主要出版、報道數學-MATHEMATICS領域的研究動態以及在該領域取得的各方面的經驗和科研成果，介紹該領域有關本專業的最新進展，探討行業發展的思路和方法，以促進學術信息交流，提高行業發展。該刊已被國際權威數據庫SCIE收錄，為該領域相關學科的發展起到了良好的推動作用，也得到了本專業人員的廣泛認可。該刊最新影響因子為0.3，最新CiteScore 指數為0.8。

本刊近期中國學者發表的論文主要有：

• The embedded homology of hypergraph pairs

  Author: Ren, Shiquan; Wu, Jie; Zhang, Mengmeng

• The Gordian complexes of knots given by 4-move

  Author: Ali, Danish; Yang, Zhiqing; Hussain, Abid; Ali, Muqadar

• Group-valued invariant of knots in the full torus

  Author: Manturov, Vassily Olegovich; Nikonov, Igor Mikhailovich

• Unknotting twisted knots with Gauss diagram forbidden moves

  Author: Xue, Shudan; Deng, Qingying

英文介紹

Journal Of Knot Theory And Its Ramifications雜志英文介紹

This Journal is intended as a forum for new developments in knot theory, particularly developments that create connections between knot theory and other aspects of mathematics and natural science. Our stance is interdisciplinary due to the nature of the subject. Knot theory as a core mathematical discipline is subject to many forms of generalization (virtual knots and links, higher-dimensional knots, knots and links in other manifolds, non-spherical knots, recursive systems analogous to knotting). Knots live in a wider mathematical framework (classification of three and higher dimensional manifolds, statistical mechanics and quantum theory, quantum groups, combinatorics of Gauss codes, combinatorics, algorithms and computational complexity, category theory and categorification of topological and algebraic structures, algebraic topology, topological quantum field theories).

Papers that will be published include:

-new research in the theory of knots and links, and their applications;

-new research in related fields;

-tutorial and review papers.

With this Journal, we hope to serve well researchers in knot theory and related areas of topology, researchers using knot theory in their work, and scientists interested in becoming informed about current work in the theory of knots and its ramifications.