Iana I. Anguelova
Published 2011-12-16, updated 2012-02-22Version 2
The boson-fermion correspondence of type A is an isomorphism between two super vertex algebras (and so has singularities in the operator product expansions only at $z = w$). The boson-fermion correspondence of type B plays similarly important role in many areas, including representation theory, integrable systems, random matrix theory and random processes. But the vertex operators describing it have singularities in their operator product expansions at both $z = w$ and $z = -w$, and thus need a more general notion than that of a super vertex algebra. In this paper we present such a notion: the concept of a twisted vertex algebra, which generalizes the concept of super vertex algebra. The two sides of the correspondence of type B constitute two examples of twisted vertex algebras. The boson-fermion correspondence of type B is thus an isomorphism between two twisted vertex algebras.
Comments: 11 pages, Contribution to the Proceedings of the 9-th International Workshop "Lie Theory and Its Applications in Physics" (LT-9), 20-26 June 2011, Varna, Bulgaria
Twisted vertex algebras, bicharacter construction and boson-fermion correspondences
Operator product expansions as a consequence of phase space properties
$N$-point locality for vertex operators: normal ordered products, operator product expansions, twisted vertex algebras
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