Nils Carqueville, Michael Flohr
Published 2005-08-08, updated 2005-12-05Version 2
We prove the existence and associativity of the nonmeromorphic operator product expansion for an infinite family of vertex operator algebras, the triplet W-algebras, using results from P(z)-tensor product theory. While doing this, we also show that all these vertex operator algebras are C_2-cofinite.
Comments: 21 pages, to appear in J. Phys. A: Math. Gen.; the exposition is improved and one reference is added
Journal: J.Phys. A39 (2006) 951-966
Conformal Field Theory, Vertex Operator Algebras and Operator Algebras
Representation theory in chiral conformal field theory: from fields to observables
Representations of Vertex Operator Algebras $V_{L_2}^{S_4}$ and $V_{L_2}^{A_5}$
