Your search keyword '"Davydov, Alexei"' showing total 8 results

1. Holomorphic Symplectic Fermions

Author

Davydov, Alexei and Runkel, Ingo

Subjects

Mathematics - Quantum Algebra, High Energy Physics - Theory

Abstract

Let V be the even part of the vertex operator super-algebra of r pairs of symplectic fermions. Up to two conjectures, we show that V admits a unique holomorphic extension if r is a multiple of 8, and no holomorphic extension otherwise. This is implied by two results obtained in this paper: 1) If r is a multiple of 8, one possible holomorphic extension is given by the lattice vertex operator algebra for the even self dual lattice $D_r^+$ with shifted stress tensor. 2) We classify Lagrangian algebras in SF(h), a ribbon category associated to symplectic fermions. The classification of holomorphic extensions of V follows from 1) and 2) if one assumes that SF(h) is ribbon equivalent to Rep(V), and that simple modules of extensions of V are in one-to-one relation with simple local modules of the corresponding commutative algebra in SF(h).

Published

2016

2. N=2 minimal conformal field theories and matrix bifactorisations of x^d

Author

Davydov, Alexei, Camacho, Ana Ros, and Runkel, Ingo

Subjects

Mathematics - Quantum Algebra, High Energy Physics - Theory, Mathematics - Category Theory

Abstract

We prove a tensor equivalence between full subcategories of a) graded matrix factorisations of the potential x^d-y^d and b) representations of the N=2 minimal super vertex operator algebra at central charge 3-6/d, where d is odd. The subcategories are given by a) permutation-type matrix factorisations with consecutive index sets, and b) Neveu-Schwarz-type representations. The physical motivation for this result is the Landau-Ginzburg / conformal field theory correspondence, where it amounts to the equivalence of a subset of defects on both sides of the correspondence. Our work builds on results by Brunner and Roggenkamp [arXiv:0707.0922], where an isomorphism of fusion rules was established., Comment: 29 pages

Published

2014

3. Functoriality of the center of an algebra

Author

Davydov, Alexei, Kong, Liang, and Runkel, Ingo

Subjects

Mathematics - Quantum Algebra, High Energy Physics - Theory

Abstract

The notion of the center of an algebra over a field k has a far reaching generalization to algebras in monoidal categories. The center then lives in the monoidal center of the original category. This generalization plays an important role in the study of bulk-boundary duality of rational conformal field theories. In this paper, we study functorial properties of the center. We show that it gives rise to a 2-functor from the bicategory of semisimple indecomposable module categories over a fusion category to the bicategory of commutative algebras in the monoidal center of this fusion category. Morphism spaces of the latter bicategory are extended from algebra homomorphisms to certain categories of cospans. We conjecture that the above 2-functor arises from a lax 3-functor between tricategories, and that in this setting one can relax the conditions from fusion categories to finite tensor categories. We briefly outline how one is naturally lead to the above 2-functor when studying rational conformal field theory with defects of all codimensions. For example, the cospans of the target bicategory correspond to spaces of defect fields and to the bulk-defect operator product expansions., Comment: 74 pages, 4 figures

Published

2013

4. A braided monoidal category for symplectic fermions

Author

Davydov, Alexei and Runkel, Ingo

Subjects

Mathematics - Quantum Algebra, High Energy Physics - Theory, Mathematics - Category Theory

Abstract

We describe a class of examples of braided monoidal categories which are built from Hopf algebras in symmetric categories. The construction is motivated by a calculation in two-dimensional conformal field theory and is tailored to contain the braided monoidal categories occurring in the study of the Ising model, their generalisation to Tamabara-Yamagami categories, and categories occurring for symplectic fermions., Comment: 7 pages, contribution to the proceedings of the XXIX International Colloquium on Group-Theoretical Methods in Physics (20-26 August 2012, Tianjin, China)

Published

2013

5. Z/2Z-extensions of Hopf algebra module categories by their base categories

Author

Davydov, Alexei and Runkel, Ingo

Subjects

Mathematics - Quantum Algebra, High Energy Physics - Theory, Mathematics - Category Theory

Abstract

Starting with a self-dual Hopf algebra H in a braided monoidal category S we construct a Z/2Z-graded monoidal category C = C_0 + C_1. The degree zero component is the category Rep_S(H) of representations of H and the degree one component is the category S. The extra structure on H needed to define the associativity isomorphisms is a choice of self-duality map and cointegral, subject to certain conditions. We also describe rigid, braided and ribbon structures on C in Hopf algebraic terms. Our construction permits a uniform treatment of Tambara-Yamagami categories and categories related to symplectic fermions in conformal field theory., Comment: 79 pages (but results summarised in self-contained introduction), numerous hand-crafted string diagrams; v2: reorganised paper according to referee's suggestions and corrected some inaccuracies

Published

2012

6. Field theories with defects and the centre functor

Author

Davydov, Alexei, Kong, Liang, and Runkel, Ingo

Subjects

Mathematics - Quantum Algebra, High Energy Physics - Theory, Mathematics - Category Theory

Abstract

This note is intended as an introduction to the functorial formulation of quantum field theories with defects. After some remarks about models in general dimension, we restrict ourselves to two dimensions - the lowest dimension in which interesting field theories with defects exist. We study in some detail the simplest example of such a model, namely a topological field theory with defects which we describe via lattice TFT. Finally, we give an application in algebra, where the defect TFT provides us with a functorial definition of the centre of an algebra. This involves changing the target category of commutative algebras into a bicategory. Throughout this paper, we emphasise the role of higher categories - in our case bicategories - in the description of field theories with defects., Comment: 63 pages, 17 figures. Contribution to the volume "Mathematical Foundations of Quantum Field and Perturbative String Theory" by B. Jurco, H. Sati, U. Schreiber (eds.)

Published

2011

7. Commutative Algebras in Fibonacci Categories

Author

Davydov, Alexei and Booker, Tom

Subjects

Mathematics - Category Theory, High Energy Physics - Theory, Mathematics - Representation Theory

Abstract

By studying NIM-representations we show that the Fibonacci category and its tensor powers are completely anisotropic; that is, they do not have any non-trivial separable commutative ribbon algebras. As an application we deduce that a chiral algebra with the representation category equivalent to a product of Fibonacci categories is maximal; that is, it is not a proper subalgebra of another chiral algebra. In particular the chiral algebras of the Yang-Lee model, the WZW models of G2 and F4 at level 1, as well as their tensor powers, are maximal.

Published

2011

8. Invertible defects and isomorphisms of rational CFTs

Author

Davydov, Alexei, Kong, Liang, and Runkel, Ingo

Subjects

High Energy Physics - Theory, Mathematics - Category Theory, Mathematics - Quantum Algebra

Abstract

Given two two-dimensional conformal field theories, a domain wall -- or defect line -- between them is called invertible if there is another defect with which it fuses to the identity defect. A defect is called topological if it is transparent to the stress tensor. A conformal isomorphism between the two CFTs is a linear isomorphism between their state spaces which preserves the stress tensor and is compatible with the operator product expansion. We show that for rational CFTs there is a one-to-one correspondence between invertible topological defects and conformal isomorphisms if both preserve the rational symmetry. This correspondence is compatible with composition., Comment: 20 pages, 17 figures.

Published

2010