Noncommutative Riemann Surfaces

Abstract

We compactify M(atrix) theory on Riemann surfaces Sigma with genus g>1. Following [1], we construct a projective unitary representation of pi1(Sigma) realized on L2(H), with H the upper half-plane. As a first step we introduce a suitably gauged sl2(R) algebra. Then a uniquely determined gauge connection provides the central extension which is a 2-cocycle of the 2nd Hochschild cohomology group. Our construction is the double-scaling limit N∞, k-∞ of the representation considered in the Narasimhan-Seshadri theorem, which represents the higher-genus analog of 't Hooft's clock and shift matrices of QCD. The concept of a noncommutative Riemann surface Sigmaθ is introduced as a certain C-algebra. Finally we investigate the Morita equivalence.

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