Stochastic geometric mechanics : CIB, Lausanne, Switzerland, January-June 2015
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Bibliographic Information
Stochastic geometric mechanics : CIB, Lausanne, Switzerland, January-June 2015
(Springer proceedings in mathematics & statistics, v. 202)
Springer, c2017
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Includes bibliographical references and index
Description and Table of Contents
Description
Collecting together contributed lectures and mini-courses, this book details the research presented in a special semester titled "Geometric mechanics - variational and stochastic methods" run in the first half of 2015 at the Centre Interfacultaire Bernoulli (CIB) of the Ecole Polytechnique Federale de Lausanne. The aim of the semester was to develop a common language needed to handle the wide variety of problems and phenomena occurring in stochastic geometric mechanics. It gathered mathematicians and scientists from several different areas of mathematics (from analysis, probability, numerical analysis and statistics, to algebra, geometry, topology, representation theory, and dynamical systems theory) and also areas of mathematical physics, control theory, robotics, and the life sciences, with the aim of developing the new research area in a concentrated joint effort, both from the theoretical and applied points of view.
The lectures were given by leading specialists in different areas of mathematics and its applications, building bridges among the various communities involved and working jointly on developing the envisaged new interdisciplinary subject of stochastic geometric mechanics.
Table of Contents
A. Arnaudon, A. L. De Castro and D. D. Holm, Noise and dissipation in rigid-body motion.- F. Flandoli, An open problem in the theory of regularization of noise for nonlinear PSDs.- G. Da Prato, Surface integrals in Hilbert spaces for general measures and applications.- F. Gay-Balmaz and V. Putkaradze, On noise extensions of nonholonomic constrants.- G. S. Chirikjian, Degenerate diffusions and harmonic analysis on SE(3). A tutorial.- B. Janssens and K. H. Neeb, Covariant central extensions of gauge Lie algebras.- Th. Levy and A. Sengupta, Four chapters on Low-dimensional Gauge theories.- Y. Brenier, Some variational and stochastic methods for the Euler equations of incompressible fluid dynamics and related models.- G. A. Chechkhin, Introduction to homogenization theory.- L. Bittner, H. Gottschalk, M. Groeger, N. Moch, M. Saad, and S. Schmitz, Modeling, minimizing and managing the risk of fatigue for mechanical compo
nents.- Index.
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