Automorphisms of quantum and classical Poisson algebras

J. Grabowski; N. Poncin

doi:10.1112/S0010437X0300006X

Abstract

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We prove Pursell–Shanks type results for the Lie algebra $\mathcal{D}(M)$ of all linear differential operators of a smooth manifold M, for its Lie subalgebra $\mathcal{D}^1(M)$ of all linear first-order differential operators of M and for the Poisson algebra S(M) = Pol(T*M) of all polynomial functions on T*M, the symbols of the operators in $\mathcal{D}(M)$. Chiefly, however, we provide explicit formulas completely describing the automorphisms of the Lie algebras $\mathcal{D}^1(M)$, S(M) and $\mathcal{D}(M)$.

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Poncin, N. 2004. Equivariant Operators Between Some Modules of the Lie Algebra of Vector Fields. Communications in Algebra, Vol. 32, Issue. 7, p. 2559.

Grabowski, J. and Poncin, N. 2005. Derivations of the Lie algebras of differential operators. Indagationes Mathematicae, Vol. 16, Issue. 2, p. 181.

D'AVANZO, ANTONELLA MARMO, GIUSEPPE and VALENTINO, ALESSANDRO 2005. REDUCTION AND UNFOLDING FOR QUANTUM SYSTEMS: THE HYDROGEN ATOM. International Journal of Geometric Methods in Modern Physics, Vol. 02, Issue. 06, p. 1043.

Grabowski, Janusz 2007. From Geometry to Quantum Mechanics. Vol. 252, Issue. , p. 131.

CARIÑENA, JOSÉ F. CLEMENTE-GALLARDO, JESÚS and MARMO, GIUSEPPE 2007. REDUCTION PROCEDURES IN CLASSICAL AND QUANTUM MECHANICS. International Journal of Geometric Methods in Modern Physics, Vol. 04, Issue. 08, p. 1363.

Grabowski, Janusz Kotov, Alexei and Poncin, Norbert 2011. Geometric structures encoded in the lie structure of an Atiyah algebroid. Transformation Groups, Vol. 16, Issue. 1, p. 137.

Covolo, Tiffany Ovsienko, Valentin and Poncin, Norbert 2012. Higher trace and Berezinian of matrices over a Clifford algebra. Journal of Geometry and Physics, Vol. 62, Issue. 11, p. 2294.

Grabowski, Janusz Khudaverdyan, David and Poncin, Norbert 2013. The supergeometry of Loday algebroids. Journal of Geometric Mechanics, Vol. 5, Issue. 2, p. 185.

GRABOWSKI, JANUSZ 2013. BRACKETS. International Journal of Geometric Methods in Modern Physics, Vol. 10, Issue. 08, p. 1360001.

Bavula, Vladimir V. 2016. The groups of automorphisms of the Witt W n and Virasoro Lie algebras. Czechoslovak Mathematical Journal, Vol. 66, Issue. 4, p. 1129.

Bavula, V. V. 2017. The groups of automorphisms of the Lie algebras of polynomial vector fields with zero or constant divergence. Communications in Algebra, Vol. 45, Issue. 3, p. 1114.

Bruce, Andrew and Poncin, Norbert 2021. Products in the category of 𝕑2n-manifolds. Journal of Nonlinear Mathematical Physics, Vol. 26, Issue. 3, p. 420.

Bekaert, Xavier 2021. Notes on Higher-Spin Diffeomorphisms. Universe, Vol. 7, Issue. 12, p. 508.

Bekaert, Xavier 2023. Geometric tool kit for higher-spin gravity (Part I): An introduction to the geometry of differential operators. International Journal of Modern Physics A, Vol. 38, Issue. 08,

Article contents

Automorphisms of quantum and classical Poisson algebras

Abstract

Keywords

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

Automorphisms of quantum and classical Poisson algebras

Abstract

Keywords

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