The asymptotic behavior of the solutions of the Duffing-type equation (Formula presented.) where δ≥0, σ>0 and ε is bounded and nonnegative, is investigated. When F≡0, if ε is infinitesimal at infinity, it is shown that both vanishing (for t→+∞) and unbounded solutions may exist, while this scenario dramatically changes if ε is integrable on (0,+∞). This brings evidence of a high sensitivity of the response of the considered equation with respect to ε. In the periodically forced case, it is then shown that the attractor of the associated Poincaré map can be arcwise disconnected. Applications to models describing the dynamics of suspension bridges are also discussed.
Long-term dynamics of Duffing-type equations with applications to suspension bridges
Garrione, Maurizio;Gazzola, Filippo;Pastorino, Emanuele
2025-01-01
Abstract
The asymptotic behavior of the solutions of the Duffing-type equation (Formula presented.) where δ≥0, σ>0 and ε is bounded and nonnegative, is investigated. When F≡0, if ε is infinitesimal at infinity, it is shown that both vanishing (for t→+∞) and unbounded solutions may exist, while this scenario dramatically changes if ε is integrable on (0,+∞). This brings evidence of a high sensitivity of the response of the considered equation with respect to ε. In the periodically forced case, it is then shown that the attractor of the associated Poincaré map can be arcwise disconnected. Applications to models describing the dynamics of suspension bridges are also discussed.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
