Nilmanifolds and their associated non local fields
Abstract
For six dimensional nilmanifolds we build a module H of an affine Kac Moody vertex algebras. Then, we associate some logarithmic fields for the module H and we study their singularities. We also presented a physics motivation behind this construction. We study a particular case, we show that when the nilmanifold N is a k degree S1--fibration over the two torus and a choice of l ∈ Z H3(N, Z) the fields associated to the space H have tri-logarithm singularities whenever kl ≠ 0.
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