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Trudy Instituta Matematiki i Mekhaniki UrO RAN, 2006, Volume 12, Number 2, Pages 129–141
(Mi timm158)
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Necessary optimality conditions for different phase portraits in a neigh-borhood of a singular arc
A. A. Melikyan
Abstract:
An optimal control problem with scalar control is characterized by two Hamiltonians related to boundary
values of the control parameter. Intermediate (internal) values of the control and the corresponding singular
trajectories (arcs) can be constructed in terms of these two Hamiltonians using Poisson brackets. All multiple
Poisson brackets using these Hamiltonians two, three, and four times vanish on a singular arc of the second
order and the brackets with five Hamiltonians in general differ from zero. There exist six different multiple
Poisson brackets in which Hamiltonians are used five times. A regular arc in the optimal phase portrait
is linked with a singular arc after one, several, or infinitely many (Fuller phenomenon) switchings. In the
paper it is shown that various collections of the signs for these six quantities – multiple Poisson
brackets – correspond to the above-mentioned cases. There exist four different collections of the signs for the set consisting of six Poisson brackets. The singularity including a universal surface is investigated for the
general case, whereas two other types of singularities are studied in particular examples.
Received: 21.06.2006
Citation:
A. A. Melikyan, “Necessary optimality conditions for different phase portraits in a neigh-borhood of a singular arc”, Control, stability, and inverse problems of dynamics, Trudy Inst. Mat. i Mekh. UrO RAN, 12, no. 2, 2006, 129–141; Proc. Steklov Inst. Math. (Suppl.), 255, suppl. 2 (2006), S126–S139
Linking options:
https://www.mathnet.ru/eng/timm158 https://www.mathnet.ru/eng/timm/v12/i2/p129
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Abstract page: | 355 | Full-text PDF : | 129 | References: | 59 |
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