New conformal field theories associated with lie algebras and their partition functions

A large class of 2D conformal field theories with extended Virasoro algebras related to the GKO construction on the coset SU(2)⊗SU(2)/SU(2) is introduced. Through a Feigin-Fuchs construction the Kac formula is deduced. Characters of the highest-weight irreducible representations are given in terms of the GKO decomposition branching functions. Modular invariant partition functions are constructed and an A-D-E classification based on a triple of simply-laced Lie algebras is analyzed in detail.

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Conformal Field Theory of Free Bosonic and Fermionic Fields

Statistical Field Theory ◽

10.1093/oso/9780198788102.003.0012 ◽

2020 ◽

pp. 443-475

Author(s):

Giuseppe Mussardo

Keyword(s):

Field Theories ◽

Majorana Fermion ◽

Partition Functions ◽

Conformal Field Theories ◽

Bosonic Field ◽

Conformal Field ◽

Mathematical Identities ◽

Modular Transformations ◽

Fermionic Fields ◽

The Subject

Free theories are usually regarded as trivial examples of quantum systems. This chapter proves that this is not the case of the conformal field theories associated to the free bosonic and fermionic fields. The subject is not only full of beautiful mathematical identities but is also the source of deep physical concepts with far reaching applications. Chapter 12 also covers quantization of the bosonic field, vertex operators, the free bosonic field on a torus, modular transformations, the quantization of the free Majorana fermion, the Neveu–Schwarz and Ramond sectors, fermions on a torus, calculus for anti-commuting quantities and partition functions.

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BITS AND PIECES IN LOGARITHMIC CONFORMAL FIELD THEORY

International Journal of Modern Physics A ◽

10.1142/s0217751x03016859 ◽

2003 ◽

Vol 18 (25) ◽

pp. 4497-4591 ◽

Cited By ~ 154

Author(s):

MICHAEL A. I. FLOHR

Keyword(s):

Field Theory ◽

Conformal Field Theory ◽

Quantum Hall ◽

Field Theories ◽

Partition Functions ◽

Conformal Field Theories ◽

Fractional Quantum Hall ◽

Conformal Field ◽

Logarithmic Conformal Field Theory ◽

Verlinde Formula

These are notes of my lectures held at the first School & Workshop on Logarithmic Conformal Field Theory and its Applications, September 2001 in Tehran, Iran. These notes cover only selected parts of the by now quite extensive knowledge on logarithmic conformal field theories. In particular, I discuss the proper generalization of null vectors towards the logarithmic case, and how these can be used to compute correlation functions. My other main topic is modular invariance, where I discuss the problem of the generalization of characters in the case of indecomposable representations, a proposal for a Verlinde formula for fusion rules and identities relating the partition functions of logarithmic conformal field theories to such of well known ordinary conformal field theories. The two main topics are complemented by some remarks on ghost systems, the Haldane-Rezayi fractional quantum Hall state, and the relation of these two to the logarithmic c=-2 theory.

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TOWERS OF ALGEBRAS IN RATIONAL CONFORMAL FIELD THEORIES

International Journal of Modern Physics A ◽

10.1142/s0217751x91001039 ◽

1991 ◽

Vol 06 (12) ◽

pp. 2045-2074 ◽

Cited By ~ 2

Author(s):

CÉSAR GOMEZ ◽

GERMAN SIERRA

Keyword(s):

Sufficient Conditions ◽

Field Theories ◽

Partition Functions ◽

Polynomial Equations ◽

Conformal Field Theories ◽

Modular Invariant ◽

Conformal Field ◽

Ade Classification

Jones fundamental construction is applied to rational conformal field theories. The Jones algebra which emerges in this application is realized in terms of duality operations. The generators of the algebra are an open version of Verlinde’s operators. The polynomial equations appear in this context as sufficient conditions for the existence of Jones algebra. The ADE classification of modular invariant partition functions is put in correspondence with Jones classification of subfactors.

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CLONING SO(N) LEVEL 2

International Journal of Modern Physics A ◽

10.1142/s0217751x99000658 ◽

1999 ◽

Vol 14 (08) ◽

pp. 1283-1291 ◽

Cited By ~ 4

Author(s):

A. N. SCHELLEKENS

Keyword(s):

Infinite Number ◽

Essential Role ◽

Field Theories ◽

Partition Functions ◽

Conformal Field Theories ◽

Modular Invariant ◽

Chiral Algebra ◽

Conformal Field ◽

N Level ◽

Level 2

For each N an infinite number of conformal field theories is presented that has the same fusion rules as SO (N) level 2. These new theories are obtained as extensions of the chiral algebra of SO (NM2) level 2, and correspond to new modular invariant partition functions of these theories. A one-to-one map between the c=1 orbifolds of radius R2=2r and Dr level 2 plays an essential role.

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CONFORMAL FIELD THEORIES ON SURFACES WITH BOUNDARIES AND CROSSCAPS

Modern Physics Letters A ◽

10.1142/s0217732389000228 ◽

1989 ◽

Vol 04 (02) ◽

pp. 161-168 ◽

Cited By ~ 20

Author(s):

TETSUYA ONOGI ◽

NOBUYUKI ISHIBASHI

Keyword(s):

Crucial Role ◽

Model Building ◽

Open String ◽

Theory Model ◽

Field Theories ◽

Partition Functions ◽

Conformal Field Theories ◽

Modular Invariant ◽

Conformal Field ◽

Loop Channel

We classify the possible operator contents of the minimal conformal field theories when boundaries and crosscaps are present by imposing loop channel-tree channel duality conditions. These are the open string analogues of modular invariant partition functions, which play a crucial role in string theory model building.

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THE CAPPELLI–ITZYKSON–ZUBER A-D-E CLASSIFICATION

Reviews in Mathematical Physics ◽

10.1142/s0129055x00000265 ◽

2000 ◽

Vol 12 (05) ◽

pp. 739-748 ◽

Cited By ~ 7

Author(s):

TERRY GANNON

Keyword(s):

Mathematical Structure ◽

The Other ◽

Field Theories ◽

Partition Functions ◽

Conformal Field Theories ◽

Modular Invariant ◽

Conformal Field ◽

Affine Algebras ◽

Order Of Magnitude ◽

The Rich

In 1986 Cappelli, Itzykson and Zuber classified all modular invariant partition functions for the conformal field theories associated to the affine A1 algebra; they found they fall into an A-D-E pattern. Their proof was difficult and attempts to generalise it to the other affine algebras failed — in hindsight the reason is that their argument ignored most of the rich mathematical structure present. We give here the "modern" proof of their result; it is an order of magnitude simpler and shorter, and much of it has already been extended to all other affine algebras. We conclude with some remarks on the A-D-E pattern appearing in this and other RCFT classifications.

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LOCALIZED MODES IN SINGULAR CALABI-YAU CONFORMAL FIELD THEORIES

International Journal of Modern Physics A ◽

10.1142/s0217751x08040779 ◽

2008 ◽

Vol 23 (14n15) ◽

pp. 2184-2186

Author(s):

SHUN'YA MIZOGUCHI

Keyword(s):

Discrete Series ◽

Field Theories ◽

Partition Functions ◽

Type Ii ◽

Conformal Field Theories ◽

Modular Invariant ◽

Heterotic Strings ◽

Conformal Field ◽

Series Representations ◽

Discrete Series Representations

We construct spacetime supersymmetric, modular invariant partition functions for type II and heterotic strings on the conifold-type singularities such that they include contributions coming from the discrete-series representations of SL(2, R). In particular for the E8 × E8 heterotic case, they are in the 27 representation of E6 and localized on a four-dimensional "brane" at the tip of the cigar geometry.

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Genus two partition functions of extremal conformal field theories

Journal of High Energy Physics ◽

10.1088/1126-6708/2007/08/029 ◽

2007 ◽

Vol 2007 (08) ◽

pp. 029-029 ◽

Cited By ~ 24

Author(s):

Davide Gaiotto ◽

Xi Yin

Keyword(s):

Field Theories ◽

Partition Functions ◽

Conformal Field Theories ◽

Conformal Field ◽

Genus Two

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Harmonic analysis of 2d CFT partition functions

Journal of High Energy Physics ◽

10.1007/jhep09(2021)174 ◽

2021 ◽

Vol 2021 (9) ◽

Author(s):

Nathan Benjamin ◽

Scott Collier ◽

A. Liam Fitzpatrick ◽

Alexander Maloney ◽

Eric Perlmutter

Keyword(s):

Partition Function ◽

Harmonic Analysis ◽

Moduli Space ◽

Target Space ◽

Field Theories ◽

Partition Functions ◽

Two Dimensional ◽

Conformal Field Theories ◽

Conformal Field ◽

Operator Spectrum

Abstract We apply the theory of harmonic analysis on the fundamental domain of SL(2, ℤ) to partition functions of two-dimensional conformal field theories. We decompose the partition function of c free bosons on a Narain lattice into eigenfunctions of the Laplacian of worldsheet moduli space ℍ/SL(2, ℤ), and of target space moduli space O(c, c; ℤ)\O(c, c; ℝ)/O(c)×O(c). This decomposition manifests certain properties of Narain theories and ensemble averages thereof. We extend the application of spectral theory to partition functions of general two-dimensional conformal field theories, and explore its meaning in connection to AdS3 gravity. An implication of harmonic analysis is that the local operator spectrum is fully determined by a certain subset of degeneracies.

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