Twisted Lie group $C^*$-algebras as strict quantizations
数学物理
2016-09-07 v1 math.MP
算子代数
辛几何
摘要
A nonzero 2-cocycle Γ∈Z2(\g,R) on the Lie algebra \g of a compact Lie group G defines a twisted version of the Lie-Poisson structure on the dual Lie algebra \g∗, leading to a Poisson algebra C∞(\g(Γ)∗). Similarly, a multiplier c∈Z2(G,U(1)) on G which is smooth near the identity defines a twist in the convolution product on G, encoded by the twisted group C∗-algebra C^*(G,c).FurthertosomesuperficialyetenlighteninganalogiesbetweenC^{\infty}(\g^*_{(\Gamma)})andC^*(G,c),itisshownthatthelatterisastrictquantizationoftheformer,wherePlanck′sconstant\hbarassumesvaluesin(\Z\backslash\{0\})^{-1}.ThismeansthatthereexistsacontinuousfieldofC^*−algebras,indexedby\hbar\in 0\cup (\Z\backslash\{0\})^{-1},forwhich\A^0=C_0(\g^*)and\A_{\hbar}=C^*(G,c)for\hbar\neq 0,alongwithacross−sectionofthefieldsatisfyingDirac′sconditionasymptoticallyrelatingthecommutatorin\A_{\hbar}tothePoissonbracketonC^{\infty}(\g^*_{(\Gamma)}).Notethatthe‘quantization′of\hbardoesnotoccurfor\Gamma=0$.
引用
@article{arxiv.math-ph/9807028,
title = {Twisted Lie group $C^*$-algebras as strict quantizations},
author = {N. P. Landsman},
journal= {arXiv preprint arXiv:math-ph/9807028},
year = {2016}
}
备注
7 pages