We study the ordinary differential equation εx ̈ + x ̇ + εg(x) = εf(ωt), with f and g analytic and f quasi-periodic in t with frequency vector ω ∈ Rd. We show that if there exists c0 ∈ R such that g(c0) equals the average of f and the first non-zero derivative of g at c0 is of odd order n, then, for ε small enough and under very mild Diophantine conditions on ω, there exists a quasi-periodic solution close to c0, with the same frequency vector as f. In particular if f is a trigonometric polynomial the Diophantine condition on ω can be completely removed. This extends results previously available in the literature for n = 1. We also point out that, if n = 1 and the first derivative of g at c0 is positive, then the quasi-periodic solution is locally unique and attractive.
Corsi, L., Feola, R., Gentile, G. (2014). Convergent series for quasi-periodically forced strongly dissipative systems. COMMUNICATIONS IN CONTEMPORARY MATHEMATICS, 16(3), 1350022 [10.1142/S0219199713500223].
Convergent series for quasi-periodically forced strongly dissipative systems
CORSI L;FEOLA R;GENTILE, Guido
2014-01-01
Abstract
We study the ordinary differential equation εx ̈ + x ̇ + εg(x) = εf(ωt), with f and g analytic and f quasi-periodic in t with frequency vector ω ∈ Rd. We show that if there exists c0 ∈ R such that g(c0) equals the average of f and the first non-zero derivative of g at c0 is of odd order n, then, for ε small enough and under very mild Diophantine conditions on ω, there exists a quasi-periodic solution close to c0, with the same frequency vector as f. In particular if f is a trigonometric polynomial the Diophantine condition on ω can be completely removed. This extends results previously available in the literature for n = 1. We also point out that, if n = 1 and the first derivative of g at c0 is positive, then the quasi-periodic solution is locally unique and attractive.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
