Projective-type differential invariants and geometric curve evolutions of KdV-type in flat homogeneous manifolds

Gloria Marí Beffa

Displaying similar documents to “Projective-type differential invariants and geometric curve evolutions of KdV-type in flat homogeneous manifolds”

Moving frames, Geometric Poisson brackets and the KdV-Schwarzian evolution of pure spinors

Gloria Marí Beffa (2011)

Annales de l’institut Fourier

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In this paper we describe a non-local moving frame along a curve of pure spinors in $O (2 m, 2 m) / P$ , and its associated basis of differential invariants. We show that the space of differential invariants of Schwarzian-type define a Poisson submanifold of the spinor Geometric Poisson brackets. The resulting restriction is given by a decoupled system of KdV Poisson structures. We define a generalization of the Schwarzian-KdV evolution for pure spinor curves and we prove that it induces a decoupled system...

Geometric realizations of bi-Hamiltonian completely integrable systems.

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Differential invariants of conformal and projective surfaces.

Hubert, Evelyne, Olver, Peter J. (2007)

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The Theory of differential invariance and infinite dimensional Hamiltonian evolutions

Gloria Beffa (2000)

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In this paper we describe the close relationship between invariant evolutions of projective curves and the Hamiltonian evolutions of Adler, Gel'fand and Dikii. We also show how KdV evolutions are related as well to invariant evolutions of projective surfaces.

Second order differential invariants of linear frames.

Brajerčík, Ján (2010)

Balkan Journal of Geometry and its Applications (BJGA)

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A remarkable contraction of semisimple Lie algebras

Dmitri I. Panyushev, Oksana S. Yakimova (2012)

Annales de l’institut Fourier

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Recently, E.Feigin introduced a very interesting contraction $𝔮$ of a semisimple Lie algebra $𝔤$ (see arXiv:1007.0646 and arXiv:1101.1898). We prove that these non-reductive Lie algebras retain good invariant-theoretic properties of $𝔤$ . For instance, the algebras of invariants of both adjoint and coadjoint representations of $𝔮$ are free, and also the enveloping algebra of $𝔮$ is a free module over its centre.

Jet geometrical extension of the KCC-invariants.

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Balkan Journal of Geometry and its Applications (BJGA)

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Formal geometric quantization

Paul-Émile Paradan (2009)

Annales de l’institut Fourier

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Let $K$ be a compact Lie group acting in a Hamiltonian way on a symplectic manifold $(M, Ω)$ which is pre-quantized by a Kostant-Souriau line bundle. We suppose here that the moment map $Φ$ is proper so that the reduced space $M_{μ} : = Φ^{- 1} (K \cdot μ) / K$ is compact for all $μ$ . Then, we can define the “formal geometric quantization” of $M$ as $𝒬_{K}^{- \infty} (M) : = \sum_{μ \in \hat{K}} 𝒬 (M_{μ}) V_{μ}^{K} .$ The aim of this article is to study the functorial properties of the assignment $(M, K) \to 𝒬_{K}^{- \infty} (M)$ .