Contributions to the study of nonholonomic Riemannian manifolds

Barrett, Dennis Ian

Title: Contributions to the study of nonholonomic Riemannian manifolds
Creator: Barrett, Dennis Ian
ThesisAdvisor: Remsing, Claudiu-Cristian
ThesisAdvisor: Rossi, Olga
Subject: Riemannian manifolds
Subject: Curvature
Subject: Lie groups
Subject: Geometry, Riemannian
Subject: Tensor fields
Date: 2017
Type: Doctoral theses
Type: text
Identifier: http://hdl.handle.net/10962/7554
Identifier: vital:21272
Identifier: DOI https://doi.org/10.21504/10962/7554
Description: In this thesis we consider nonholonomic Riemannian manifolds, and in particular, left- invariant nonholonomic Riemannian structures on Lie groups. These structures are closely related to mechanical systems with (positive definite) quadratic Lagrangians and nonholo- nomic constraints linear in velocities. In the first chapter, we review basic concepts of non- holonomic Riemannian geometry, including the left-invariant structures. We also examine the class of left-invariant structures with so-called Cartan-Schouten connections. The second chapter investigates the curvature of nonholonomic Riemannian manifolds and the Schouten and Wagner curvature tensors. The Schouten tensor is canonically associated to every non- holonomic Riemannian structure (in particular, we use it to define isometric invariants for structures on three-dimensional manifolds). By contrast, the Wagner tensor is not generally intrinsic, but can be used to characterise flat structures (i.e., those whose associated parallel transport is path-independent). The third chapter considers equivalence of nonholonomic Rie- mannian manifolds, particularly up to nonholonomic isometry. We also introduce the notion of a nonholonomic Riemannian submanifold, and investigate the conditions under which such a submanifold inherits its geometry from the enveloping space. The latter problem involves the concept of a geodesically invariant distribution, and we show it is also related to the curvature. In the last chapter we specialise to three-dimensional nonholonomic Riemannian manifolds. We consider the equivalence of such structures up to nonholonomic isometry and rescaling, and classify the left-invariant structures on the (three-dimensional) simply connected Lie groups. We also characterise the flat structures in three dimensions, and then classify the flat structures on the simply connected Lie groups. Lastly, we consider three typical examples of (left-invariant) nonholonomic Riemannian structures on three-dimensional Lie groups, two of which arise from problems in classical mechanics (viz., the Chaplygin problem and the Suslov problem).
Description: Thesis (PhD) -- Faculty of Science, Mathematics (Pure and Applied), 2017
Format: computer, online resource, application/pdf, 1 online resource (194 pages), pdf
Publisher: Rhodes University, Faculty of Science, Mathematics (Pure and Applied)
Language: English
Rights: Barrett, Dennis Ian
Rights: Attribution 4.0 International (CC BY 4.0)
Rights: Open Access

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