2009
DOI: 10.3842/sigma.2009.074
|View full text |Cite
|
Sign up to set email alerts
|

Deformation Quantization of Poisson Structures Associated to Lie Algebroids

Abstract: Abstract. In the present paper we explicitly construct deformation quantizations of certain Poisson structures on E * , where E −→ M is a Lie algebroid. Although the considered Poisson structures in general are far from being regular or even symplectic, our construction gets along without Kontsevich's formality theorem but is based on a generalized Fedosov construction. As the whole construction merely uses geometric structures of E we also succeed in determining the dependence of the resulting star products o… Show more

Help me understand this report
View preprint versions

Search citation statements

Order By: Relevance

Paper Sections

Select...
1
1
1
1

Citation Types

0
7
0

Year Published

2015
2015
2023
2023

Publication Types

Select...
5
1

Relationship

0
6

Authors

Journals

citations
Cited by 7 publications
(7 citation statements)
references
References 41 publications
0
7
0
Order By: Relevance
“…The anchor is given by ρ(p, ξ) = −ξ C p . In particular, one can check that π KKS is the negative of the linear Poisson structure on its dual C × g * in the convention of [30].…”
Section: Application Of the Homological Perturbation Lemmamentioning
confidence: 99%
“…The anchor is given by ρ(p, ξ) = −ξ C p . In particular, one can check that π KKS is the negative of the linear Poisson structure on its dual C × g * in the convention of [30].…”
Section: Application Of the Homological Perturbation Lemmamentioning
confidence: 99%
“…We notice that by the relation It is well known, see [33,41], that there is an one-to-one correspondence between Lie algebroid structures on the vector bundle p : E → M and specific Poisson structures on the total space of the corresponding dual bundle E * → M , called the dual Poisson structures, defined by the following brackets of basic and fiber-linear functions (with respect to foliation by fibres of E * ):…”
Section: Almost Complex Lie Algebroids Over Almost Complex Manifoldsmentioning
confidence: 99%
“…To name just a few, work on the various generalizations continues, for example on Jacobi-Nijenhuis algebroids [18], while the implications of the properties of the modular classes of Poisson-Nijenhuis structures on manifolds and on Lie algebroids for the theory of integrable systems are being studied [4]. Closely related works are those of Launois and Richard on Poisson algebras [83], that of Dolgushev [26] on the exponentiation of the modular class into an automorphism of an associative, non-commutative algebra, quantizing a Poisson algebra, and that of Neumaier and Waldmann on the relationship between unimodularity and the existence of a trace in a quantized algebra [103]. The relationship between unimodularity and the existence of a trace on non-commutative algebras was already stressed by Weinstein in [124] and should be the subject of further work.…”
Section: Appendix: Additional References and Conclusionmentioning
confidence: 99%
“…This vertical lift, in turn, can be identified with a vector field on F , tangent to the fibers and invariant by translations along each fiber. In this way, the modular class of a Lie algebroid E can be identified [124,103] with the modular class of the Poisson manifold E * , when E * is equipped with the linear Poisson structure (see, e.g., [94] [34]). …”
Section: The Modular Class Of a Lie Algebroidmentioning
confidence: 99%