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 of to the resolvent algebra introduced by Buchholz and Grundling [JFA, 2008]. The associated quantization map is a field-theoretical Weyl quantization compatible with the work of Binz, Honegger and Rieckers [AHPO, 2004]. We also define a Berezin-type quantization map on all of , which continuously and injectively maps it onto a dense subset of the resolvent algebra. The commutative resolvent algebra , generally defined on a real inner product space , intimately depends on the finite dimensional subspaces of . We thoroughly analyze the structure of this algebra in the finite dimensional case by giving a characterization of its elements and by computing its Gelfand spectrum.
Keywords
Cite
@article{arxiv.1903.04819,
title = {Quantization and the Resolvent Algebra},
author = {Teun D. H. van Nuland},
journal= {arXiv preprint arXiv:1903.04819},
year = {2024}
}
Comments
This version fixes Theorem 3.10