The phenomenon of a topological monodromy in integrable Hamiltonian and nonholonomic systems is discussed. An efficient method for
computing and visualizing the monodromy is developed. The comparative
analysis of the topological monodromy is given for the rolling ellipsoid of
revolution problem in two cases, namely, on a smooth and on a rough
plane. The first of these systems is Hamiltonian, the second is nonholonomic. We show that, from the viewpoint of monodromy, there is no
difference between the two systems, and thus disprove the conjecture by
Cushman and Duistermaat stating that the topological monodromy gives
a topological obstruction for Hamiltonization of the rolling ellipsoid of
revolution on a rough plane.
History
School
Science
Department
Mathematical Sciences
Published in
JOURNAL OF GEOMETRY AND PHYSICS
Volume
87
Pages
61 - 75 (15)
Citation
BOLSINOV, A.V., KILIN, A.A. and KAZAKOV, A.O., 2015. Topological monodromy as an obstruction to Hamiltonization of nonholonomic systems: pro or contra? Journal of Geometry and Physics, 87, pp.61-75
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