MATHEMATICA BOHEMICA, Vol. 126, No. 3, pp. 593-606 (2001)
The period of a whirling pendulum
Hana Lichardova
Hana Lichardova, Department of Mathematics, Faculty of Electrical Engineering and Information Technology, Slovak University of Technology, Ilkovicova 3, 812 19 Bratislava, Slovakia, e-mail: lichardova@kmat.elf.stuba.sk
Abstract:
The period function of a planar parameter-depending Hamiltonian system is examined. It is proved that, depending on the value of the parameter, it is either monotone or has exactly one critical point.
Keywords: Hamiltonian system, period function, Picard-Fuchs equations
Classification (MSC2000): 37G15, 34C05
Full text of the article:
[Previous Article] [Next Article] [Contents of this Number]
© 2005 ELibM and
FIZ Karlsruhe / Zentralblatt MATH
for the EMIS Electronic Edition