Homogeneous Real (2,3,5) Distributions with Isotropy

Travis Willse

arXiv:1807.02734·math.DG·February 5, 2019

Homogeneous Real (2,3,5) Distributions with Isotropy

Travis Willse

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TL;DR

This paper classifies a special class of geometric structures called homogeneous real (2,3,5) distributions, identifying all such structures that are multiply transitive, up to local diffeomorphism equivalence.

Contribution

It provides a complete classification of multiply transitive homogeneous real (2,3,5) distributions up to local diffeomorphism.

Findings

01

Complete classification achieved

02

Identification of all multiply transitive cases

03

Advancement in understanding geometric structures with isotropy

Abstract

We classify multiply transitive homogeneous real (2,3,5) distributions up to local diffeomorphism equivalence.

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