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Труды Института математики и механики УрО РАН, 2003, том 9, номер 1, страницы 159–164
(Mi timm269)
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On the dynamic unfolding of a saddle-center bifurcation and the change in the action
R. Habermana, D. C. Diminnieb a Department of Mathematics, Southern Methodist University, Dallas, USA
b Texas Instruments Incorporated, Dallas, USA
Аннотация:
Conservative Hamiltonian systems with slow variations are considered in the case of a dynamic saddle-center
bifurcation. Using the method of averaging, action is an adiabatic invariant before and after the slow passage
of the homoclinic orbit. The bifurcation is unfolded by assuming that the time that the method of averaging
predicts that the homoclinic orbit is crossed is near to the time of the saddle-center bifurcation. The slow
passage through homoclinic orbits associated with the unfolding of a saddle-center bifurcation is analyzed and
the change in the adiabatic invariant is computed.
Поступила в редакцию: 11.11.2002
Образец цитирования:
R. Haberman, D. C. Diminnie, “On the dynamic unfolding of a saddle-center bifurcation and the change in the action”, Асимптотические разложения. Теория приближений. Топология, Сборник статей, Тр. ИММ УрО РАН, 9, no. 1, 2003, 159–164; Proc. Steklov Inst. Math. (Suppl.), 2003no. , suppl. 1, S91–S97
Образцы ссылок на эту страницу:
https://www.mathnet.ru/rus/timm269 https://www.mathnet.ru/rus/timm/v9/i1/p159
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