FUNDAMENTALNAYA
I PRIKLADNAYA MATEMATIKA
(FUNDAMENTAL AND APPLIED MATHEMATICS)
2000, VOLUME 6, NUMBER 2, PAGES 357-377
On two-dimensional integral varieties of a class of discontinuous
Hamiltonian systems
V. F. Borisov
Abstract
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We consider the following discontinuous Hamiltonian system
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H(y) = H0(y)+u H1(y),
u = sgn H1(y), I = |
æ
ç
è
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ö
÷.
ø
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Here is the
unit ´ n)-matrix,
Î
R2n.
Under general assumptions, we prove that a vicinity of
a singular extremal of order (£ q £ n) contains
integral
varieties with chattering trajectories.
That means that the trajectories enter into the singular extremal
at a finite instant with an infinite number of intersections
with the surface of discontinuity (Fuller's phenomenon).
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Location: http://mech.math.msu.su/~fpm/eng/k00/k002/k00202h.htm
Last modified: September 1, 2000