In this paper we study some key effects of a discontinuous forcing term in a fourth order wave equation on a bounded domain, modeling the adhesion of an elastic beam with a substrate through an elastic-breakable interaction. By using a spectral decomposition method we show that the main effects induced by the nonlinearity at the transition from attached to detached states can be traced in a loss of regularity of the solution and in a migration of the total energy through the scales.
Regularity and energy transfer for a nonlinear beam equation / Coclite, G. M.; Fanizza, G.; Maddalena, F.. - In: APPLIED MATHEMATICS LETTERS. - ISSN 0893-9659. - STAMPA. - 115:(2021). [10.1016/j.aml.2020.106959]
Regularity and energy transfer for a nonlinear beam equation
Coclite, G. M.
;Maddalena, F.
2021-01-01
Abstract
In this paper we study some key effects of a discontinuous forcing term in a fourth order wave equation on a bounded domain, modeling the adhesion of an elastic beam with a substrate through an elastic-breakable interaction. By using a spectral decomposition method we show that the main effects induced by the nonlinearity at the transition from attached to detached states can be traced in a loss of regularity of the solution and in a migration of the total energy through the scales.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
