Add to ORKGThere are various, quite different mathematical approaches to quantum field theories, among them functorial field theories in the sense of Atiyah and Segal and the factorization algebras of quantum observables of Costello and Gwilliam. In the talk I will describe a construction that produces a twisted functorial field theory from a factorization algebra, thus relating these two approaches. This is joint work with Bill Dwyer and Peter Teichner.Non UBCUnreviewedAuthor affiliation: University of Notre DameFacult
We demonstrate that perturbative algebraic QFT methods, as developed by Fredenhagen and Rejzner, nat...
This book gives an exposition of the relations among the following three topics: monoidal tensor cat...
International audienceWe explain how to perform topological twisting of supersymmetric field theorie...
Factorization algebras are local-to-global objects that play a role in classical and quantum field t...
Factorization algebras, and factorization homology, began in the work of Beilinson-Drinfeld, as an a...
There are three intertwined schools of thought in the world of factorization algebras. First, chrono...
There are three intertwined schools of thought in the world of factorization algebras. First, chrono...
The aim of this book is to introduce mathematicians (and, in particular, graduate students) to the m...
These are notes from talks given at a spring school on topological quantum field theory in Nova Scot...
Abstract: Topological quantum field theories are invariants of manifolds which can be computed via c...
Algebarski pristupi kvantnoj teoriji polja fizikalnim opservablama nastoje dodijeliti matematičku st...
We extend the previously introduced constructive modular method to nonperturbative QFT. In particula...
In the last 20 years, the study of operator algebras has developed from a branch of functional analy...
This text focuses on the algebraic formulation of quantum field theory, from the introductory aspect...
In the last 20 years, the study of operator algebras has developed from a branch of functional analy...
We demonstrate that perturbative algebraic QFT methods, as developed by Fredenhagen and Rejzner, nat...
This book gives an exposition of the relations among the following three topics: monoidal tensor cat...
International audienceWe explain how to perform topological twisting of supersymmetric field theorie...
Factorization algebras are local-to-global objects that play a role in classical and quantum field t...
Factorization algebras, and factorization homology, began in the work of Beilinson-Drinfeld, as an a...
There are three intertwined schools of thought in the world of factorization algebras. First, chrono...
There are three intertwined schools of thought in the world of factorization algebras. First, chrono...
The aim of this book is to introduce mathematicians (and, in particular, graduate students) to the m...
These are notes from talks given at a spring school on topological quantum field theory in Nova Scot...
Abstract: Topological quantum field theories are invariants of manifolds which can be computed via c...
Algebarski pristupi kvantnoj teoriji polja fizikalnim opservablama nastoje dodijeliti matematičku st...
We extend the previously introduced constructive modular method to nonperturbative QFT. In particula...
In the last 20 years, the study of operator algebras has developed from a branch of functional analy...
This text focuses on the algebraic formulation of quantum field theory, from the introductory aspect...
In the last 20 years, the study of operator algebras has developed from a branch of functional analy...
We demonstrate that perturbative algebraic QFT methods, as developed by Fredenhagen and Rejzner, nat...
This book gives an exposition of the relations among the following three topics: monoidal tensor cat...
International audienceWe explain how to perform topological twisting of supersymmetric field theorie...