Quantum differential surfaces of higher genera

Abstract

We first construct a real family of SL(2,R)-invariant symbol composition product \θ\θ∈,R on the analogue of the Schwartz space S(D) on the hyperbolic plane D\;:=\;SL(2,R)/SO(2). The value θ=0 consists in the pointwise commutative product of functions on D. And admits an asymptotic expansion that deforms the pointwise product in the direction of the canonical SL(2,R) -invariant Kahler two form on D. We then extend this construction to any (non-homogeneous) compact surface by considering the left action of an arithmetic Fuschian group ⊂ SL(2,R) on D with associated Riemann surface \;:=\;. More precisely, the product θ extends from S(D) to a smooth SL(2,R)- sub-module of C∞(D) that contains the -invariants C∞(D) C∞() in C∞(D). In particular, θ defines a Fr\'echet algebra structure on C∞(). The resulting algebra is pre - C and admits a continuous trace.