Graded Poisson Algebras

Cattaneo, Alberto S.; Fiorenza, Domenico; Longoni, Riccardo

doi:10.1016/b0-12-512666-2/00434-x

Cited by 17 publications

(29 citation statements)

References 32 publications

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“…18 One succinct way to define the Ω-background, at least formally, comes from considering our 3d N = 4 theory as a 1d N = 4 theory. 19 From the 1d point of view, the U(1) symmetry generated by X is just a global symmetry, and the Ω-background can be viewed as a complex twisted-mass deformation associated to this global symmetry. In particular, even after the deformation, we still have a conventional 1d N = 4 theory.…”

Section: Properties Of the ω-Backgroundmentioning

confidence: 99%

Secondary Products in Supersymmetric Field Theory

Beem

Ben‐Zvi

Bullimore

et al. 2020

Ann. Henri Poincaré

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The product of local operators in a topological quantum field theory in dimension greater than one is commutative, as is more generally the product of extended operators of codimension greater than one. In theories of cohomological type these commutative products are accompanied by secondary operations, which capture linking or braiding of operators, and behave as (graded) Poisson brackets with respect to the primary product. We describe the mathematical structures involved and illustrate this general phenomenon in a range of physical examples arising from supersymmetric field theories in spacetime dimension two, three, and four. In the Rozansky-Witten twist of three-dimensional N = 4 theories, this gives an intrinsic realization of the holomorphic symplectic structure of the moduli space of vacua. We further give a simple mathematical derivation of the assertion that introducing an Ω-background precisely deformation quantizes this structure. We then study the secondary product structure of extended operators, which subsumes that of local operators but is often much richer. We calculate interesting cases of secondary brackets of line operators in Rozansky-Witten theories and in four-dimensional N = 4 super Yang-Mills theories, measuring the noncommutativity of the spherical category in the geometric Langlands program.

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Section: Properties Of the ω-Backgroundmentioning

confidence: 99%

Secondary Products in Supersymmetric Field Theory

Beem

Ben‐Zvi

Bullimore

et al. 2020

Ann. Henri Poincaré

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“…for any homogeneous elements a, b, c ∈ A, then A is called a graded Poisson algebra [3]. If in addition, there is a k-linear homogeneous map d : A → A of degree 1 such that d 2 = 0 and…”

Section: Preliminariesmentioning

confidence: 99%

“…Finally, it only remains to show that dS = S d. Note that dS (a) =dS (a (1) ε(a (2) )) = d(S (a (1) )ε(a (2) )) =d(S (a (1) )a (2) S (a (3) )) = dS (a (1) )a (2) S (a (3) ) + (−1) |a (1) | S (a (1) )d(a (2) S (a (3) )) =dS (a (1) )a (2) S (a (3) ) + (−1) |a (1) | S (a (1) )(d(a (2) )S (a (3) ) + (−1) |a (2) | a (2) dS (a (3) )) =dS (a) + (−1) |a (1) | S (a (1) )d(a (2) )S (a (3) ) + (−1) |a (1) a (2) | dS (a), we get dS (a) = −(−1) |a (2) | S (a (1) )d(a (2) )S (a (3) ).…”

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The structures on the universal enveloping algebras of differential graded Poisson Hopf algebras

Guo

Lü

et al. 2018

Communications in Algebra

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“…In this section, examples of DG Poisson algebras are provided arising from Lie theory, differential geometry, homological algebra and deformation theory. See more examples in [5,9]. 5.1.…”

Section: Further Examples Of Dg Poisson Algebrasmentioning

confidence: 99%

“…The Poisson bracket was originally introduced by French Mathematician Siméon Denis Poisson in search for integrals of motion in Hamiltonian mechanics. For Poisson algebras, many important generalizations have been obtained in both commutative and noncommutative settings recently: Poisson orders [1], graded Poisson algebras [6,9], noncommutative Leibniz-Poisson algebras [7], left-right noncommutative Poisson algebras [8], Poisson PI algebras [19], double Poisson algebras [26], noncommutative Poisson algebras [27], Novikov-Poisson algebras [28] and Quiver Poisson algebras [30]. One of the interesting aspects of Poisson algebras is the notion of Poisson universal enveloping algebra, which was first introduced by Oh in order to describe the category of Poisson modules [22].…”

Section: Introductionmentioning

confidence: 99%

DG Poisson algebra and its universal enveloping algebra

Lü¹,

Wang²,

Zhuang³

2016

Sci. China Math.

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In this paper, we introduce the notions of differential graded (DG) Poisson algebra and DG Poisson module. Let $A$ be any DG Poisson algebra. We construct the universal enveloping algebra of $A$ explicitly, which is denoted by $A^{ue}$. We show that $A^{ue}$ has a natural DG algebra structure and it satisfies certain universal property. As a consequence of the universal property, it is proved that the category of DG Poisson modules over $A$ is isomorphic to the category of DG modules over $A^{ue}$. Furthermore, we prove that the notion of universal enveloping algebra $A^{ue}$ is well-behaved under opposite algebra and tensor product of DG Poisson algebras. Practical examples of DG Poisson algebras are given throughout the paper including those arising from differential geometry and homological algebra.Comment: Accepted by Science China Mathematic

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Graded Poisson Algebras

Cited by 17 publications

References 32 publications

Secondary Products in Supersymmetric Field Theory

Secondary Products in Supersymmetric Field Theory

The structures on the universal enveloping algebras of differential graded Poisson Hopf algebras

DG Poisson algebra and its universal enveloping algebra

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