Comparaison de L’Homologie de Hochschild et de L’Homologie de Poisson Pour Une Deformation des Surfaces de Klein
J. Alev () and
T. Lambre
Additional contact information
J. Alev: Université de Reims, Département de Mathématiques
T. Lambre: Université de Paris Sud, Département de Mathématiques
A chapter in Algebra and Operator Theory, 1998, pp 25-38 from Springer
Abstract:
Abstract Let P G be the quotient variety of the affine plane by the action of a finite group G ⊂ SL(2,ℂ); then P G inherits in a natural way a Poisson algebra structure. Let A 1 (ℂ) be the first Weyl algebra ℂ[p, q] with the relation pq-qp=1, on which G acts by automorphisms in such a way that the invariant algebra A 1 (ℂ) G is a deformation of P G . We prove that the trace group HH 0(A 1(ℂ) G ) is a deformation of the Poisson homology group HH 0(A 1(ℂ) G ). Moreover, these two groups are ℂ-vector spaces of finite dimension and dim (HH 0(A 1(ℂ) G )) = dim (H 0 Pois (P G )) = s(G) - 1, where s(G) denotes the number of irreducible representations of G.
Keywords: Weyl Algebra; Cyclic Homology; Affine Plane; Invariant Algebra; Trace Group (search for similar items in EconPapers)
Date: 1998
References: Add references at CitEc
Citations:
There are no downloads for this item, see the EconPapers FAQ for hints about obtaining it.
Related works:
This item may be available elsewhere in EconPapers: Search for items with the same title.
Export reference: BibTeX
RIS (EndNote, ProCite, RefMan)
HTML/Text
Persistent link: https://EconPapers.repec.org/RePEc:spr:sprchp:978-94-011-5072-9_3
Ordering information: This item can be ordered from
http://www.springer.com/9789401150729
DOI: 10.1007/978-94-011-5072-9_3
Access Statistics for this chapter
More chapters in Springer Books from Springer
Bibliographic data for series maintained by Sonal Shukla () and Springer Nature Abstracting and Indexing ().