Subharmonic bifurcation from infinity |
| |
Authors: | Alexander M Krasnosel'skii Dmitrii I Rachinskii |
| |
Institution: | a Institute for Information Transmission Problems, Russian Academy of Sciences, 19 Bol. Karetny lane, GSP-4, Moscow 127994, Russia b Department of Applied Mathematics, University College Cork, Ireland |
| |
Abstract: | We are concerned with a subharmonic bifurcation from infinity for scalar higher order ordinary differential equations. The equations contain principal linear parts depending on a scalar parameter, 2π-periodic forcing terms, and continuous nonlinearities with saturation. We suggest sufficient conditions for the existence of subharmonics (i.e., periodic solutions of multiple periods 2πn) with arbitrarily large amplitudes and periods. We prove that this type of the subharmonic bifurcation occurs whenever a pair of simple roots of the characteristic polynomial crosses the imaginary axis at the points ±αi with an irrational α. Under some further assumptions, we estimate asymptotically the parameter intervals, where large subharmonics of periods 2πn exist. These assumptions relate the quality of the Diophantine approximations of α, the rate of convergence of the nonlinearity to its limits at infinity, and the smoothness of the forcing term. |
| |
Keywords: | 34B15 37G15 |
本文献已被 ScienceDirect 等数据库收录! |
|