Shortest Paths for Sub-Riemannian Metrics on Rank-Two Distributions
Title | Shortest Paths for Sub-Riemannian Metrics on Rank-Two Distributions PDF eBook |
Author | Wensheng Liu |
Publisher | American Mathematical Soc. |
Pages | 121 |
Release | 1995 |
Genre | Mathematics |
ISBN | 0821804049 |
A sub-Riemannian manifold ([italic capitals]M, E, G) consists of a finite-dimensional manifold [italic capital]M, a rank-two bracket generating distribution [italic capital]E on [italic capital]M, and a Riemannian metric [italic capital]G on [italic capital]E. All length-minimizing arcs on ([italic capitals]M, E, G) are either normal extremals or abnormal extremals. Normal extremals are locally optimal, i.e., every sufficiently short piece of such an extremal is a minimizer. The question whether every length-minimizer is a normal extremal was recently settled by R. G. Montgomery, who exhibited a counterexample. The present work proves that regular abnormal extremals are locally optimal, and, in the case that [italic capital]E satisfies a mild additional restriction, the abnormal minimizers are ubiquitous rather than exceptional. All the topics of this research report (historical notes, examples, abnormal extremals, Hamiltonians, nonholonomic distributions, sub-Riemannian distance, the relations between minimality and extremality, regular abnormal extremals, local optimality of regular abnormal extremals, etc.) are presented in a very clear and effective way.
Shortest Paths for Sub-Riemannian Metrics on Rank-two Distributions
Title | Shortest Paths for Sub-Riemannian Metrics on Rank-two Distributions PDF eBook |
Author | Wensheng Liu |
Publisher | |
Pages | 104 |
Release | 1995 |
Genre | Geodesics |
ISBN | 9781470401436 |
Sub-Riemannian Geometry
Title | Sub-Riemannian Geometry PDF eBook |
Author | Andre Bellaiche |
Publisher | Birkhäuser |
Pages | 404 |
Release | 2012-12-06 |
Genre | Mathematics |
ISBN | 3034892101 |
Sub-Riemannian geometry (also known as Carnot geometry in France, and non-holonomic Riemannian geometry in Russia) has been a full research domain for fifteen years, with motivations and ramifications in several parts of pure and applied mathematics, namely: control theory classical mechanics Riemannian geometry (of which sub-Riemannian geometry constitutes a natural generalization, and where sub-Riemannian metrics may appear as limit cases) diffusion on manifolds analysis of hypoelliptic operators Cauchy-Riemann (or CR) geometry. Although links between these domains had been foreseen by many authors in the past, it is only in recent years that sub- Riemannian geometry has been recognized as a possible common framework for all these topics. This book provides an introduction to sub-Riemannian geometry and presents the state of the art and open problems in the field. It consists of five coherent and original articles by the leading specialists: Andr Bellache: The tangent space in sub-Riemannian geometry Mikhael Gromov: Carnot-Carathodory spaces seen from within Richard Montgomery: Survey of singular geodesics Hctor J. Sussmann: A cornucopia of four-dimensional abnormal sub-Riemannian minimizers Jean-Michel Coron: Stabilization of controllable systems.
Geometric Control Theory and Sub-Riemannian Geometry
Title | Geometric Control Theory and Sub-Riemannian Geometry PDF eBook |
Author | Gianna Stefani |
Publisher | Springer |
Pages | 385 |
Release | 2014-06-05 |
Genre | Mathematics |
ISBN | 331902132X |
Honoring Andrei Agrachev's 60th birthday, this volume presents recent advances in the interaction between Geometric Control Theory and sub-Riemannian geometry. On the one hand, Geometric Control Theory used the differential geometric and Lie algebraic language for studying controllability, motion planning, stabilizability and optimality for control systems. The geometric approach turned out to be fruitful in applications to robotics, vision modeling, mathematical physics etc. On the other hand, Riemannian geometry and its generalizations, such as sub-Riemannian, Finslerian geometry etc., have been actively adopting methods developed in the scope of geometric control. Application of these methods has led to important results regarding geometry of sub-Riemannian spaces, regularity of sub-Riemannian distances, properties of the group of diffeomorphisms of sub-Riemannian manifolds, local geometry and equivalence of distributions and sub-Riemannian structures, regularity of the Hausdorff volume, etc.
A Tour of Subriemannian Geometries, Their Geodesics and Applications
Title | A Tour of Subriemannian Geometries, Their Geodesics and Applications PDF eBook |
Author | Richard Montgomery |
Publisher | American Mathematical Soc. |
Pages | 282 |
Release | 2002 |
Genre | Mathematics |
ISBN | 0821841653 |
Subriemannian geometries can be viewed as limits of Riemannian geometries. They arise naturally in many areas of pure (algebra, geometry, analysis) and applied (mechanics, control theory, mathematical physics) mathematics, as well as in applications (e.g., robotics). This book is devoted to the study of subriemannian geometries, their geodesics, and their applications. It starts with the simplest nontrivial example of a subriemannian geometry: the two-dimensional isoperimetric problem reformulated as a problem of finding subriemannian geodesics. Among topics discussed in other chapters of the first part of the book are an elementary exposition of Gromov's idea to use subriemannian geometry for proving a theorem in discrete group theory and Cartan's method of equivalence applied to the problem of understanding invariants of distributions. The second part of the book is devoted to applications of subriemannian geometry. In particular, the author describes in detail Berry's phase in quantum mechanics, the problem of a falling cat righting herself, that of a microorganism swimming, and a phase problem arising in the $N$-body problem. He shows that all these problems can be studied using the same underlying type of subriemannian geometry. The reader is assumed to have an introductory knowledge of differential geometry. This book that also has a chapter devoted to open problems can serve as a good introduction to this new, exciting area of mathematics.
Sub-Riemannian Geometry
Title | Sub-Riemannian Geometry PDF eBook |
Author | Ovidiu Calin |
Publisher | Cambridge University Press |
Pages | 371 |
Release | 2009-04-20 |
Genre | Mathematics |
ISBN | 0521897300 |
A comprehensive text and reference on sub-Riemannian and Heisenberg manifolds using a novel and robust variational approach.
A Comprehensive Introduction to Sub-Riemannian Geometry
Title | A Comprehensive Introduction to Sub-Riemannian Geometry PDF eBook |
Author | Andrei Agrachev |
Publisher | Cambridge University Press |
Pages | 765 |
Release | 2019-10-31 |
Genre | Mathematics |
ISBN | 110847635X |
Provides a comprehensive and self-contained introduction to sub-Riemannian geometry and its applications. For graduate students and researchers.