On the Quantization-Dequantization Correspondence for (co)Poisson Hopf Algebras
Abstract
In this paper, we construct a functorial quantization of (co)Poisson Hopf algebras within a broad categorical framework. We further introduce categories naturally associated with (co)Poisson Hopf algebras, namely Drinfeld-Yetter modules. These categories provide a canonical setting in which we define explicit dequantization functors that are inverse to the quantization functors. Using this framework, we also establish functorial (de)quantization results for the corresponding module categories. Finally, we recover the classical results of Etingof and Kazhdan as special cases of our construction and discuss applications to deformation quantization à la Tamarkin.
Growth and citations
This paper is currently showing No growth state computed yet..
Citation metrics and growth state from academic sources (e.g. Semantic Scholar). See About for details.
Cited by (0)
No citing papers yet
Papers that cite this one will appear here once data is available.
View citations page →References (0)
No references in DB yet
References for this paper will appear here once ingested.
Related papers in Mathematical Physics
- Spectral gap for Pollicott-Ruelle resonances on random coverings of Anosov surfaces0 citations
- Length spectrum of periodic rays for billard flow0 citations
- Non-perturbative renormalization for lattice massive QED$_2$: the ultraviolet problem0 citations
Growth transitions
No transitions recorded yet
Growth state transitions will appear here once computed.