Construction of Periodic Solutions of One Class Nonautonomous Systems of Differential Equations ()
Abstract
In this article we proposed a method
for constructing approximations to periodic solutions of one class nonautonomous
system of ordinary differential equations. It is based on successive
approximation scheme using parallel symbolic calculations
to obtain solutions in analytical form. We showed the
convergence of the scheme of successive approximations on
the period, and also considered an example of a second order system where the described
scheme of calculations can be applied.
Share and Cite:
Pchelintsev, A. (2013) Construction of Periodic Solutions of One Class Nonautonomous Systems of Differential Equations.
Journal of Applied Mathematics and Physics,
1, 1-4. doi:
10.4236/jamp.2013.13001.
Conflicts of Interest
The authors declare no conflicts of interest.
References
[1]
|
M. A. Krasnosel’skij, “The Shift Operator along Trajectories of Differential Equations (in Russian),” Nauka, Moscow, 1966.
|
[2]
|
V. A. Pliss, “Nonlocal Problems of Oscillation Theory (in Russian),” Nauka, Moscow, 1964, pp. 107-110,113.
|
[3]
|
B. P. Demidovich, “Lectures on the Mathematical Stability Theory (in Russian),” Nauka, Moscow, 1967.
|
[4]
|
I. S. Gradshtejn and I. M. Ryzhik, “Tables of Integrals, Sums, Series and Multiplications (in Russian),” Fizmatlit, Moscow, 1963, p. 39.
|