Anthony D. Blaom scite author profile

Anthony D. Blaom

5Publications

243Citation Statements Received

28Citation Statements Given

How they've been cited

155

233

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Education New Zealand, University of Auckland, California Institute of Technology

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Geometric structures as deformed infinitesimal symmetries

Blaom

2006

Trans. Amer. Math. Soc.

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Abstract. A general model for geometric structures on differentiable manifolds is obtained by deforming infinitesimal symmetries. Specifically, this model consists of a Lie algebroid, equipped with an affine connection compatible with the Lie algebroid structure. The curvature of this connection vanishes precisely when the structure is locally symmetric.This model generalizes Cartan geometries, a substantial class, to the intransitive case. Simple examples are surveyed and corresponding local obstructions to symmetry are identified. These examples include foliations, Riemannian structures, infinitesimal G-structures, symplectic and Poisson structures.

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Lie algebroids and Cartan’s method of equivalence

Blaom

2012

Trans. Amer. Math. Soc.

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Abstract.Élie Cartan's general equivalence pr of Lie algebroids. The resulting formalism, bein allows for a full geometric interpretation of Carta reduction and prolongation. We show how to co (Cartan algebroids) for objects of finite-type, a directly as 'infinitesimal symmetries deformed b Details are developed for transitive structure include intransitive structures (intransitive symm illustrations include subriemannian contact stru try.c'est la dissymétrie qui crée le phénomène

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A geometric setting for Hamiltonian perturbation theory

Blaom¹

2001

Memoirs of the AMS

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Reconstruction phases via Poisson reduction

Blaom

2000

Differential Geometry and its Applications

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MLJ: A Julia package for composable machine learning

Blaom¹,

Király²,

Lienart³

et al. 2020

JOSS

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Anthony D. Blaom

Geometric structures as deformed infinitesimal symmetries

Lie algebroids and Cartan’s method of equivalence

A geometric setting for Hamiltonian perturbation theory

Reconstruction phases via Poisson reduction

MLJ: A Julia package for composable machine learning

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