Quantization and the Resolvent Algebra
Abstract
We introduce a novel commutative C*algebra of functions on a symplectic vector space admitting a complex structure, along with a strict deformation quantization that maps a dense subalgebra to the resolvent algebra introduced by Buchholz and Grundling \cite{BG2008}. The associated quantization map is a fieldtheoretical Weyl quantization compatible with the work of Binz, Honegger and Rieckers \cite{BHR}. We also define a Berezintype quantization map on the whole C*algebra, which continuously and bijectively maps it onto the resolvent algebra. This C*algebra, generally defined on a real inner product space X, intimately depends on the finite dimensional subspaces of X. We thoroughly analyze the structure and applicability of this algebra in the finite dimensional case by giving a characterization of its elements and by computing its Gelfand spectrum.
 Publication:

arXiv eprints
 Pub Date:
 March 2019
 arXiv:
 arXiv:1903.04819
 Bibcode:
 2019arXiv190304819V
 Keywords:

 Mathematics  Functional Analysis
 EPrint:
 doi:10.1016/j.jfa.2019.02.022