English

Formal multiparameter quantum groups, deformations and specializations

Quantum Algebra 2026-03-06 v6 Mathematical Physics math.MP Rings and Algebras

Abstract

We introduce the notion of formal multiparameter quantum universal enveloping algebras - in short FoMpQUEA - as a straightforward generalization of Drinfeld's quantum group. Then we show that the class of FoMpQUEA's is closed under deformations by ("toral") twists and deformations by ("toral") 2-cocycles: as a consequence, all "multiparameter formal QUEA's" considered so far are recovered, as falling within this class. In particular, we prove that any FoMpQUEA is isomorphic to a suitable deformation, by twist or by 2-cocycle, of Drinfeld's standard QUEA. We introduce also multiparameter Lie bialgebras (in short, MpLbA's), and we consider their deformations, by twist and by 2-cocycles. The semiclassical limit of every FoMpQUEA is a suitable MpLbA, and conversely each MpLbA can be quantized to a suitable FoMpQUEA. In the end, we prove that, roughly speaking, the two processes of "specialization" (of FoMpQUEA to a MpLbA) and of "deformation (by toral twist or toral 2-cocycle)" - at the level of FoMpQUEA's or of MpLbA's - do commute with each other.

Keywords

Cite

@article{arxiv.2203.11023,
  title  = {Formal multiparameter quantum groups, deformations and specializations},
  author = {Gastón Andrés García and Fabio Gavarini},
  journal= {arXiv preprint arXiv:2203.11023},
  year   = {2026}
}

Comments

87 pages. This is the final version, ***strongly improved*** w.r.t. the original submission. There is an important CORRECTION in formula (4.5) - page 34 - which has a misprint in the printed, journal version

R2 v1 2026-06-24T10:20:35.854Z