Add to ORKGTopology has become increasingly important in the study of many-body quantum mechanics, in both high energy and condensed matter applications. While the importance of smooth topology has long been appreciated in this context, especially with the rise of index theory, torsion phenomena and discrete group symmetries are relatively new directions. In this thesis, I collect some mathematical results and conjectures that I have encountered in the exploration of these new topics. I also give an introduction to some quantum field theory topics I hope will be accessible to topologists
Topological quantum field theory (TQFT) is a vast and rich subject that relates in a profound manner...
We construct an elementary, combinatorial kind of topological quantum field theory, based on curves,...
I present a brief review on some of the recent developments in topological quantum field theory. The...
We give a review of the application of perturbative techniques to topological quantum field theories...
Abstract: Topological quantum field theories are invariants of manifolds which can be computed via c...
Symmetry (and group theory) is a fundamental principle of theoretical physics. Finite symmetries, co...
This volume offers an introduction, in the form of four extensive lectures, to some recent developme...
These lectures recount an application of stable homotopy theory to a concrete problem in low energy ...
Abstract. In recent years, the interplay between traditional geometric topol-ogy and theoretical phy...
The volume conjecture states that for a hyperbolic knot K in the three-sphere S3 the asymptotic grow...
Algebraic topology/homotopy theory is a fundamental field of mathematics, dealing with the very natu...
Abstract. This paper will describe how combinatorial interpretations can help us understand the alge...
We investigate the algebraic theory of symmetry-enriched topological (SET) order in (2+1)D bosonic t...
Group field theories are a generalization of matrix models which provide both a second quantized ref...
Contemporary quantum mechanics meets an explosion of different types of quantization. Some of these ...
Topological quantum field theory (TQFT) is a vast and rich subject that relates in a profound manner...
We construct an elementary, combinatorial kind of topological quantum field theory, based on curves,...
I present a brief review on some of the recent developments in topological quantum field theory. The...
We give a review of the application of perturbative techniques to topological quantum field theories...
Abstract: Topological quantum field theories are invariants of manifolds which can be computed via c...
Symmetry (and group theory) is a fundamental principle of theoretical physics. Finite symmetries, co...
This volume offers an introduction, in the form of four extensive lectures, to some recent developme...
These lectures recount an application of stable homotopy theory to a concrete problem in low energy ...
Abstract. In recent years, the interplay between traditional geometric topol-ogy and theoretical phy...
The volume conjecture states that for a hyperbolic knot K in the three-sphere S3 the asymptotic grow...
Algebraic topology/homotopy theory is a fundamental field of mathematics, dealing with the very natu...
Abstract. This paper will describe how combinatorial interpretations can help us understand the alge...
We investigate the algebraic theory of symmetry-enriched topological (SET) order in (2+1)D bosonic t...
Group field theories are a generalization of matrix models which provide both a second quantized ref...
Contemporary quantum mechanics meets an explosion of different types of quantization. Some of these ...
Topological quantum field theory (TQFT) is a vast and rich subject that relates in a profound manner...
We construct an elementary, combinatorial kind of topological quantum field theory, based on curves,...
I present a brief review on some of the recent developments in topological quantum field theory. The...