核心概念
This paper presents a novel method for constructing quantum analogues of projective spaces by deforming q-symmetric algebras, providing explicit quantizations of a large class of Poisson structures and verifying Kontsevich's conjecture on the convergence of canonical quantization in these cases.
引述
"Our goal in this paper is to produce a large class of explicit, analytic quantizations of Pn−1 for n ≥3 odd, by quantizing Poisson structures satisfying a suitable nondegeneracy condition."
"These quantizations are Artin–Schelter regular algebras with the correct Hilbert series, given by explicit quadratic relations defined combinatorially via certain decorated graphs—a special case of the 'smoothing diagrams' for log symplectic manifolds which we introduced in [19] and which were further developed by the first author in [18]."
"By construction, these quantizations form an open subset of the space of possible quadratic relations with correct Hilbert series, up to the action of GL(n), and this gives an effective description of many new irreducible components of this space—more precisely, a classification of the algebras that admit a suitably generic toric degeneration."
"Moreover, leveraging the calculation of Kontsevich’s quantization for toric Poisson structure via Hodge theory in [14, 15, 16], we prove that when the smoothing diagram has no cycles, our algebras are exactly the canonical quantizations in the sense of Kontsevich, and as a consequence we verify his conjecture on convergence (up to isomorphism) of the canonical quantization of quadratic Poisson structures in these cases."