Abstract
In this paper we prove that if a Kähler manifold ( M, ω ) admits a regular quantization then its scalar curvature is constant. Moreover, we apply this result to the two-dimensional complete Reinhardt domains in C 2 to show that such domains admit a regular quantization iff they are biholomorphically isometric to the 2-ball in C 2 endowed with the hyperbolic metric.
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