Geometry of nonholonomically constrained systems

R.H. Cushman, J.J. Duistermaat, J. Sniatycki

Research output: Book/ReportBookAcademic

Abstract

This book gives a modern differential geometric treatment of linearly nonholonomically constrained systems. It discusses in detail what is meant by symmetry of such a system and gives a general theory of how to reduce such a symmetry using the concept of a differential space and the almost Poisson bracket structure of its algebra of smooth functions. The above theory is applied to the concrete example of Carathéodory's sleigh and the convex rolling rigid body. The qualitative behavior of the motion of the rolling disk is treated exhaustively and in detail. In particular, it classifies all motions of the disk, including those where the disk falls flat and those where it nearly falls flat. The geometric techniques described in this book for symmetry reduction have not appeared in any book before. Nor has the detailed description of the motion of the rolling disk. In this respect, the authors are trail-blazers in their respective fields
Original languageEnglish
Place of PublicationSingapore [etc.]
PublisherWorld Scienctific
Number of pages422
Volume26
EditionAdvanced series in nonlinear dynamics
ISBN (Print)978-98-14289-48-1
Publication statusPublished - 2010

Keywords

  • Mathematics
  • Wiskunde en computerwetenschappen
  • Landbouwwetenschappen
  • Wiskunde: algemeen

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