Polynomial quantization on rank one para-Hermitian symmetric spaces (Q1876552)

The authors consider a variant of quantization in the spirit of \textit{F.~Berezin} [Math.~USSR Izv. 9, 341--379 (1975); translation from Izv. Akad. Nauk SSSR, Ser. Mat. 39, 363--402 (1975; Zbl 0312.53050)] on the space \(G/H\) where \(G=\text{SD}(n, {\mathbb R})\), \(H=\text{GL}(n-1,{\mathbb R})\). It is pseudo-Riemannian and symplectic. These spaces exhaust up to covering all para-Hermitian symmetric spaces of rank one. The quantization is a polynomial quantization that is covariant and contravariant symbols are polynomials on \(G/H\). The authors introduce a multiplication of covariant symbols, establish the correspondence principle, study transformations of symbols (the Berezin transforms) and of operators, and give a full asymptotic decomposition of the Berezin transform.