P. Furlan, A. Ch. Ganchev, V. B. Petkova
Published 1996-08-04, updated 1996-09-01Version 2
We reconsider the earlier found solutions of the Knizhnik-Zamolodchikov (KZ) equations describing correlators based on the admissible representations of $A_1^{(1)}$. Exploiting a symmetry of the KZ equations we show that the original infinite sums representing the 4-point chiral correlators can be effectively summed up. Using these simplified expressions with proper choices of the contours we determine the duality (braid and fusion) transformations and show that they are consistent with the fusion rules of Awata and Yamada. The requirement of locality leads to a 1-parameter family of monodromy (braid) invariants. These analogs of the ``diagonal'' 2-dimensional local 4-point functions in the minimal Virasoro theory contain in general non-diagonal terms. They correspond to pairs of fields of identical monodromy, having one and the same counterpart in the limit to the Virasoro minimal correlators.
Comments: LaTex, 20 pages; misprints corrected, few small additions
Journal: Nucl.Phys. B491 (1997) 635-658
Fusion rules for admissible representations of affine algebras: the case of $A_2^{(1)}$
Free field realization of SL(2) correlators for admissible representations, and hamiltonian reduction for correlators
Conformal blocks for admissible representations of $SL(2)$ current algebra
