English

Full field algebras, operads and tensor categories

Quantum Algebra 2011-04-11 v3 High Energy Physics - Theory

Abstract

We study the operadic and categorical formulations of (conformal) full field algebras. In particular, we show that a grading-restricted R×R\R\times \R-graded full field algebra is equivalent to an algebra over a partial operad constructed from spheres with punctures and local coordinates. This result is generalized to conformal full field algebras over VLVRV^L\otimes V^R, where V^L and V^R are two vertex operator algebras satisfying certain finiteness and reductivity conditions. We also study the geometry interpretation of conformal full field algebras over VLVRV^L\otimes V^R equipped with a nondegenerate invariant bilinear form. By assuming slightly stronger conditions on V^L and V^R, we show that a conformal full field algebra over VLVRV^L\otimes V^R equipped with a nondegenerate invariant bilinear form exactly corresponds to a commutative Frobenius algebra with a trivial twist in the category of VLVRV^L\otimes V^R-modules. The so-called diagonal constructions of conformal full field algebras are given in tensor-categorical language.

Keywords

Cite

@article{arxiv.math/0603065,
  title  = {Full field algebras, operads and tensor categories},
  author = {Liang Kong},
  journal= {arXiv preprint arXiv:math/0603065},
  year   = {2011}
}

Comments

80 pages, 69 figures, a mistake and some misprints are corrected