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Related papers: Quantizing Poisson Manifolds

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The subject for investigation in this note is concerned with holomorphic Poisson structures on nilmanifolds with abelian complex structures. As a basic fact, we establish that on such manifolds, the Dolbeault cohomology with coefficients in…

Differential Geometry · Mathematics 2016-01-11 Zhuo Chen , Anna Fino , Yat-Sun Poon

We establish the Hodge conjecture for the top dimensional cohomology group with integer coefficients of any $q$-complete complex manifold $X$ with $q<\dim X$. This holds in particular for the complement $X=\mathbb{C}\mathbb{P}^n\setminus A$…

Algebraic Geometry · Mathematics 2016-03-09 Franc Forstneric , Jaka Smrekar , Alexandre Sukhov

A Poisson geometry arising from maximal commutative subalgebras is studied. A spectral sequence convergent to Hochschild homology with coefficients in a bimodule is presented. It depends on the choice of a maximal commutative subalgebra…

K-Theory and Homology · Mathematics 2007-05-23 Tomasz Maszczyk

For a possibly singular subset of a regular Poisson manifold we construct a deformation quantization of its algebra of Whitney functions. We then extend the construction of a deformation quantization to the case where the underlying set is…

Differential Geometry · Mathematics 2013-10-25 Markus J. Pflaum , Hessel Posthuma , Xiang Tang

We generalize the AKSZ construction of topological field theories to allow the target manifolds to have possibly-degenerate (homotopy) Poisson structures. Classical AKSZ theories, which exist for all oriented spacetimes, are described in…

Mathematical Physics · Physics 2014-05-27 Theo Johnson-Freyd

We study neighbourhoods of submanifolds in generalized complex geometry. Our first main result provides sufficient criteria for such a submanifold to admit a neighbourhood on which the generalized complex structure is B-field equivalent to…

Differential Geometry · Mathematics 2022-11-04 Michael Bailey , Gil R. Cavalcanti , Joey van der Leer Duran

To each natural deformation quantization on a Poisson manifold M we associate a Poisson morphism from the formal neighborhood of the zero section of the cotangent bundle to M to the formal neighborhood of the diagonal of the product M x M~,…

Quantum Algebra · Mathematics 2009-11-10 Alexander V. Karabegov

Using the notion of a contravariant derivative, we give some algebraic and geometric characterizations of Poisson algebras associated to the infinitesimal data of Poisson submanifolds. We show that such a class of Poisson algebras provides…

Differential Geometry · Mathematics 2021-08-04 D. García-Beltrán , J. C. Ruíz-Pantaleón , Yu. Vorobiev

Poisson brackets admit infinitesimal symmetries which are encoded using oriented graphs; this construction is due to Kontsevich (1996). We formulate several open problems about combinatorial and topological properties of the graphs…

Mathematical Physics · Physics 2019-12-24 Arthemy V. Kiselev

According to the Weinstein splitting theorem, any Poisson manifold is locally, near any given point, a product of a symplectic manifold with another Poisson manifold whose Poisson structure vanishes at the point. Similar splitting results…

Differential Geometry · Mathematics 2020-01-29 Henrique Bursztyn , Hudson Lima , Eckhard Meinrenken

We quantize the Poisson-Lie group SL(2,R)^* as a bialgebra using the product of Kontsevich. The coproduct is a deformation of the coproduct that comes from the group structure. The resulting bialgebra structure is isomorphic to the quantum…

Quantum Algebra · Mathematics 2007-05-23 Markus R. Engeli

Kontsevich's graphs from deformation quantisation allow encoding multi-vectors whose coefficients are differential-polynomial in components of Poisson brackets on finite-dimensional affine manifolds. The calculus of Kontsevich graphs can be…

Combinatorics · Mathematics 2025-12-24 Mollie S. Jagoe Brown , Arthemy V. Kiselev

The semi-classical data attached to stacks of algebroids in the sense of Kashiwara and Kontsevich are Maurer-Cartan elements on complex manifolds, which we call extended Poisson structures as they generalize holomorphic Poisson structures.…

Differential Geometry · Mathematics 2017-08-08 Zhuo Chen , Mathieu Stienon , Ping Xu

We extend the calculus of multiplicative vector fields and differential forms and their intrinsic derivatives from Lie groups to Lie groupoids; this generalization turns out to include also the classical process of complete lifting from…

dg-ga · Mathematics 2007-05-23 Kirill Mackenzie , Ping Xu

We give a simple formula for the operator C_3 of the standard deformation quantization with separation of variables on a K\"ahler manifold M. Unlike C_1 and C_2, this operator can not be expressed in terms of the K\"ahler-Poisson tensor on…

Quantum Algebra · Mathematics 2007-05-23 Alexander Karabegov

We give an abstract version of the hard Lefschetz theorem, the Lefschetz decomposition and the Hodge-Riemann theorem for compact Kaehler manifolds.

Algebraic Geometry · Mathematics 2010-05-18 Tien-Cuong Dinh , Viet-Anh Nguyen

We introduce a canonical outer vector field on a Poisson manifold, also due independently to A. Weinstein. We view it as a global section of the sheaf of Poisson vector fields modulo the subsheaf of hamiltonian vector fields. We study this…

Differential Geometry · Mathematics 2007-05-23 Jean-Luc Brylinski , Gregg Zuckerman

We introduce Poisson double algebroids, and the equivalent concept of double Lie bialgebroid, which arise as second-order infinitesimal counterparts of Poisson double groupoids. We develop their underlying Lie theory, showing how these…

Symplectic Geometry · Mathematics 2022-07-14 Henrique Bursztyn , Alejandro Cabrera , Matias del Hoyo

We compute the Poisson cohomology of a class of Poisson manifolds that are symplectic away from a collection $D$ of hypersurfaces. These Poisson structures induce a generalization of symplectic and cosymplectic structures, which we call a…

Symplectic Geometry · Mathematics 2016-05-13 Melinda Lanius

For the Kirillov-Poisson structure on the vector space $\g^*$, where $\g$ is a finite-dimensional Lie algebra, it is known at least two canonical deformations quantization of this structure: they are the M. Kontsevich universal formula [K],…

Quantum Algebra · Mathematics 2007-05-23 Boris Shoikhet
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