We prove an existence result for T-periodic retarded functional differential equations of the type x'(t) = f(t,x_t), where f is a T-periodic functional tangent vector field on a smooth manifold. As an application we show that any constrained system acted on by a periodic force, possibly with delay, admits a forced oscillation provided that the constraint is a topologically nontrivial compact manifold and the frictional coefficient is nonzero. We conjecture that the same assertion holds true even in the frictionless case.
Retarded functional differential equations on manifolds and applications to motion problems for forced constrained systems / P. Benevieri ; A. Calamai ; M. Furi ; M.P. Pera. - In: ADVANCED NONLINEAR STUDIES. - ISSN 1536-1365. - STAMPA. - 9:(2009), pp. 199-214.
Retarded functional differential equations on manifolds and applications to motion problems for forced constrained systems
BENEVIERI, PIERLUIGI;FURI, MASSIMO;PERA, MARIA PATRIZIA
2009
Abstract
We prove an existence result for T-periodic retarded functional differential equations of the type x'(t) = f(t,x_t), where f is a T-periodic functional tangent vector field on a smooth manifold. As an application we show that any constrained system acted on by a periodic force, possibly with delay, admits a forced oscillation provided that the constraint is a topologically nontrivial compact manifold and the frictional coefficient is nonzero. We conjecture that the same assertion holds true even in the frictionless case.
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