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Involutive Category Theory de Donald Yau

Involutive Category Theory: Lecture Notes in Mathematics, cartea 2279

Autor Donald Yau
en Limba Engleză Paperback – dec 2020
This monograph introduces involutive categories and involutive operads, featuring applications to the GNS construction and algebraic quantum field theory. The author adopts an accessible approach for readers seeking an overview of involutive category theory, from the basics to cutting-edge applications. Additionally, the author’s own recent advances in the area are featured, never having appeared previously in the literature.
The opening chapters offer an introduction to basic category theory, ideal for readers new to the area. Chapters three through five feature previously unpublished results on coherence and strictification of involutive categories and involutive monoidal categories, showcasing the author’s state-of-the-art research. Chapters on coherence of involutive symmetric monoidal categories, and categorical GNS construction follow. The last chapter covers involutive operads and lays important coherence foundations for applications to algebraic quantum field theory.
With detailed explanations and exercises throughout, Involutive Category Theory is suitable for graduate seminars and independent study. Mathematicians and mathematical physicists who use involutive objects will also find this a valuable reference.
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Specificații

ISBN-13: 9783030612023
ISBN-10: 3030612023
Pagini: 243
Ilustrații: XII, 243 p. 197 illus.
Dimensiuni: 155 x 235 mm
Greutate: 0.45 kg
Ediția:1st ed. 2020
Editura: Springer International Publishing
Colecția Springer
Seria Lecture Notes in Mathematics

Locul publicării:Cham, Switzerland

Cuprins

Category Theory.- Involutive Categories.- Coherence of Involutive Categories.- Involutive Monoidal Categories.- Coherence of Involutive Monoidal Categories.- Coherence of Involutive Symmetric Monoidal Categories.- Categorical Gelfand-Naimark-Segal Construction.- Involutive Operads.

Recenzii

“This is the first book whose central topic is involutive categories. It is written at the first year graduate level and is pretty much self-contained. It contains exercises and notes at the end of every chapter. It may be a useful reference for mathematicians and physicists working with involutive objects.” (Bojana Femic, Mathematical Reviews, May, 2022)

Notă biografică

Donald Yau is Professor of Mathematics at The Ohio State University at Newark. He obtained his PhD at MIT and held a post-doctoral position at the University of Illinois at Urbana-Champaign. His research focuses on algebraic topology. He has authored over forty articles and eight books, including the Springer titles Operads of Wiring Diagrams and Infinity Properads and Infinity Wheeled Properads.

Textul de pe ultima copertă

This monograph introduces involutive categories and involutive operads, featuring applications to the GNS construction and algebraic quantum field theory. The author adopts an accessible approach for readers seeking an overview of involutive category theory, from the basics to cutting-edge applications. Additionally, the author’s own recent advances in the area are featured, never having appeared previously in the literature. The opening chapters offer an introduction to basic category theory, ideal for readers new to the area. Chapters three through five feature previously unpublished results on coherence and strictification of involutive categories and involutive monoidal categories, showcasing the author’s state-of-the-art research. Chapters on coherence of involutive symmetric monoidal categories, and categorical GNS construction follow. The last chapter covers involutive operads and lays important coherence foundations for applications to algebraic quantum field theory.
With detailed explanations and exercises throughout, Involutive Category Theory is suitable for graduate seminars and independent study. Mathematicians and mathematical physicists who use involutive objects will also find this a valuable reference.

Caracteristici

Offers an accessible introduction to involutive categories and involutive operads, bringing readers from the basics to cutting-edge research Collects and expands upon material that has previously been spread across the literature Serves as an ideal resource for independent study with detailed exercises appearing at the end of each chapter