Cohomologies of \textsf{PoiMod} pairs and compatible structures on Poisson algebras
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Publication:2071027
DOI10.1016/J.GEOMPHYS.2021.104449zbMath1504.17027OpenAlexW4206364041MaRDI QIDQ2071027
Publication date: 25 January 2022
Published in: Journal of Geometry and Physics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.geomphys.2021.104449
deformationPoisson algebraNijenhuis structure\( \mathcal{O} \operatorname{N} \)-structure\( \Omega \operatorname{N} \)-structurePN-structure
Quantum groups (quantized enveloping algebras) and related deformations (17B37) Automorphisms, derivations, other operators for Lie algebras and super algebras (17B40) Poisson algebras (17B63)
Cites Work
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- Twisted Poincaré duality between Poisson homology and Poisson cohomology
- Generalized Lax pairs, the modified classical Yang-Baxter equation, and affine geometry of Lie groups
- What is a classical r-matrix?
- Cohomology structure for a Poisson algebra. II
- Compatible structures on Lie algebroids and Monge-Ampère operators
- Quantum analogy of Poisson geometry, related dendriform algebras and Rota-Baxter operators
- Les variétés de Poisson et leurs algèbres de Lie associees
- Deformation quantization of Poisson manifolds
- Cohomology and deformation of Leibniz pairs
- Double constructions of Frobenius algebras, Connes cocycles and their duality
- Compatible \(\mathcal{O}\)-operators on bimodules over associative algebras
- Noncommutative Poisson bialgebras
- The cohomology structure of an associative ring
- Commutative algebra cohology and deformations of Lie and associative algebras
- Cohomology structure for a Poisson algebra: I
- Commutative Algebras and Cohomology
- Poisson cohomology and quantization.
- What a Classical r-Matrix Really Is
- QUANTUM BI-HAMILTONIAN SYSTEMS
- Kupershmidt-(dual-)Nijenhuis structures on a Lie algebra with a representation
- Invariant Poisson–Nijenhuis structures on Lie groups and classification
- Splitting of Operations, Manin Products, and Rota–Baxter Operators
- A unified algebraic approach to the classical Yang–Baxter equation
- Poisson bialgebras
- Cohomology and deformations in graded Lie algebras
- Pre-Poisson algebras
- On the associative analog of Lie bialgebras
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