An Algorithmic Approach to Operator Product Expansions, $W$-Algebras and $W$-Strings

TL;DR

This paper develops algorithms for computing Operator Product Expansions in W-algebras, constructs explicit examples like WB_2, and explores their applications in string theory and minimal models.

Contribution

It introduces an efficient algorithm for OPE calculations in W-algebras, constructs the WB_2-algebra explicitly, and applies Drinfel'd-Sokolov reduction to analyze W-string theories.

Findings

Developed an algorithm for beta-coefficients in OPEs

Constructed the explicit WB_2-algebra

Analyzed W-string theories with minimal models

Abstract

String theory is currently the most promising theory to explain the spectrum of the elementary particles and their interactions. One of its most important features is its large symmetry group, which contains the conformal transformations in two dimensions as a subgroup. At quantum level, the symmetry group of a theory gives rise to differential equations between correlation functions of observables. We show that these Ward-identities are equivalent to Operator Product Expansions (OPEs), which encode the short-distance singularities of correlation functions with symmetry generators. The OPEs allow us to determine algebraically many properties of the theory under study. We analyse the calculational rules for OPEs, give an algorithm to compute OPEs, and discuss an implementation in Mathematica. There exist different string theories, based on extensions of the conformal algebra to so-called W-algebras. These algebras are generically nonlinear. We study their OPEs, with as main results an efficient algorithm to compute the beta-coefficients in the OPEs, the first explicit construction of the WB_2-algebra, and criteria for the factorisation of free fields in a W-algebra. An important technique to construct realisations of W-algebras is Drinfel'd- Sokolov reduction. The method consists of imposing certain constraints on the elements of an affine Lie algebra. We quantise this reduction via gauged WZNW-models. This enables us in a theory with a gauged W-symmetry, to compute exactly the correlation functions of the effective theory. Finally, we investigate the critical W-string theories based on an extension of the conformal algebra with one symmetry generator of dimension N. We clarify how the spectrum of this theory forms a minimal model of the W_N-algebra.