Simplicial Methods for Higher Categories

Simona Paoli has been active in the field of higher category theory for fifteen years and she has a very strong track record of innovation in this area. She is an expert in the use of multi-simplicial techniques in higher category theory and in applications to homotopy theory. She collaborated extensively with leading researchers both in category theory and in algebraic topology.

Part I.- Higher Categories: Introduction and Background.- An Introduction to Higher Categories.- Multi-simplicial techniques.- An Introduction to the three Segal-type models.- Techniques from 2-category theory.- Part II.- The Three Segal-Type Models and Segalic Pseudo-Functors.- Homotopically discrete n-fold categories.- The Definition of the three Segal-type models.- Properties of the Segal-type models.- Pseudo-functors modelling higher structures.- Part III.- Rigidification of Weakly Globular Tamsamani n-Categories by Simpler Ones.- Rigidifying weakly globular Tamsamani n-categories.- Part IV. Weakly globular n-fold categories as a model of weak n-categories.- Functoriality of homotopically discrete objects.- Weakly Globular n-Fold Categories as a Model of Weak n-Categories.- Conclusions and further directions.- A Proof of Lemma 0.1.4.- References.- Index.

"This book is a research monograph and is primarily aimed primarily at professionals and advanced graduate students working in topology or category theory. It would also be useful to those working in theoretical physics or algebraic geometry who use higher category methods. ... The author's solution to the homotopy hypothesis is appealing as well as geometrically and categorically insightful." (MAA Reviews, April 7, 2020)