A Selberg Integral Type Formula for an sl2 One-Dimensional Space of Conformal Blocks
Abstract
For distinct complex numbers z1,...,z2N, we give a polynomial P(y1,...,y2N) in the variables y1,...,y2N, which is homogeneous of degree N, linear with respect to each variable, sl2-invariant with respect to a natural sl2-action, and is of order N-1 at (y1,...,y2N)=(z1,...,z2N). We give also a Selberg integral type formula for the associated one-dimensional space of conformal blocks.
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