Six-dimensional (2, 0) theory can be defined on a large class of six-manifolds endowed with some additional topological and geometrical data. We discuss the nature of the object in such a theory that generalizes the partition function of a more conventional quantum field theory
We introduce the description of a Wilson surface as a 2-dimensional topological quantum field theory...
We prove a recent conjecture that the partition function of N = (2, 2) gauge theories on the two-sph...
We compute the partition function for 6d NN = 1 SO(2N) gauge theories compactified on a circle with ...
Six-dimensional (2, 0) theory can be defined on a large class of six-manifolds endowed with some add...
Six-dimensional (2, 0) theory can be defined on a large class of six-manifolds endowed with some add...
The six-dimensional (2,0) theories are a comparatively new and rather abstract type of quantum theor...
This thesis investigates certain aspects of a six-dimensional quantum theoryknown as (2,0) theory. T...
In this thesis, we will use topological field theory to do an explicit computation of a one-loop par...
We use a Hodge decomposition and its generalization to non-abelian flat vector bundles to calculate ...
We derive the partition function of 5d N= 1 gauge theories on the manifold Sb3× Σg with a partial to...
We explore five-dimensional supersymmetric quantum field theories and topological quantum field theorie...
In this thesis we give a brief review of the six-dimensional (2,0) theories and how they emerge from...
A complete theory for the line bundle structure in quantum mechanics and quantum field theory is giv...
We have recently shown that the partition function of any classical spin model, including all discre...
In joint work with I. Coman and E. Pomoni we had recently proposed a definition of the topological s...
We introduce the description of a Wilson surface as a 2-dimensional topological quantum field theory...
We prove a recent conjecture that the partition function of N = (2, 2) gauge theories on the two-sph...
We compute the partition function for 6d NN = 1 SO(2N) gauge theories compactified on a circle with ...
Six-dimensional (2, 0) theory can be defined on a large class of six-manifolds endowed with some add...
Six-dimensional (2, 0) theory can be defined on a large class of six-manifolds endowed with some add...
The six-dimensional (2,0) theories are a comparatively new and rather abstract type of quantum theor...
This thesis investigates certain aspects of a six-dimensional quantum theoryknown as (2,0) theory. T...
In this thesis, we will use topological field theory to do an explicit computation of a one-loop par...
We use a Hodge decomposition and its generalization to non-abelian flat vector bundles to calculate ...
We derive the partition function of 5d N= 1 gauge theories on the manifold Sb3× Σg with a partial to...
We explore five-dimensional supersymmetric quantum field theories and topological quantum field theorie...
In this thesis we give a brief review of the six-dimensional (2,0) theories and how they emerge from...
A complete theory for the line bundle structure in quantum mechanics and quantum field theory is giv...
We have recently shown that the partition function of any classical spin model, including all discre...
In joint work with I. Coman and E. Pomoni we had recently proposed a definition of the topological s...
We introduce the description of a Wilson surface as a 2-dimensional topological quantum field theory...
We prove a recent conjecture that the partition function of N = (2, 2) gauge theories on the two-sph...
We compute the partition function for 6d NN = 1 SO(2N) gauge theories compactified on a circle with ...
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