Hopf algebras have proved to be very interesting structures with deep connections to various areas of mathematics, particularly through quantum groups. Indeed, the study of Hopf algebras, their representations, their generalizations, and the categories related to all these objects has an interdisciplinary nature. It finds methods, relationships, motivations and applications throughout algebra, category theory, topology, geometry, quantum field theory, quantum gravity, and also combinatorics, logic, and theoretical computer science. This volume portrays the vitality of contemporary research in Hopf algebras. Altogether, the articles in the volume explore essential aspects of Hopf algebras and some of their best-known generalizations by means of a variety of approaches and perspectives. They make use of quite different techniques that are already consolidated in the area of quantum algebra. This volume demonstrates the diversity and richness of its subject. Most of its papers introduce the reader to their respective contexts and structures through very expository preliminary sections.
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ISBN-13
978-0-8218-3820-4 (9780821838204)
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Schweitzer Klassifikation
Lax braidings and the Lax centre by B. Day, E. Panchadcharam, and R. Street Dynamical quantum groups-The super story by G. Karaali Groups of grouplike elements of a semisimple Hopf algebra and its dual by Y. Kashina Higher Frobenius-Schur indicators for pivotal categories by S.-H. Ng and P. Schauenburg Doubles of (quasi) Hopf algebras and some examples of quantum groupoids and vertex groups related to them by F. Panaite Central braided Hopf algebras by P. Schauenburg A note on anti-Yetter-Drinfeld modules by M. D. Staic Representations of the Hopf algebra $U(n)$ by M. Takeuchi.
