English

Quantum differential surfaces of higher genera

Operator Algebras 2018-11-21 v2

Abstract

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

Keywords

Cite

@article{arxiv.1712.06367,
  title  = {Quantum differential surfaces of higher genera},
  author = {Pierre Bieliavsky},
  journal= {arXiv preprint arXiv:1712.06367},
  year   = {2018}
}

Comments

The proof of the proposition 7.1 page 26 contains a gap

R2 v1 2026-06-22T23:21:27.244Z