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This paper presents a derivation of the Rayleigh- Betti reciprocity relation for layered curved composite beams with interlayer slip. The principle of minimum of potential energy is also formulated for two-layer curved composite beams and its applications are illustrated by numerical examples. The solution of the presented problems are obtained by the Ritz method. The applications of the Rayleigh-Betti reciprocity relation proven are illustrated by some examples.

Energy of the harmonics in a vibrating string after the impact of a hammer

Franco Rampazzo (1986)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

In questa Nota vengono usati alcuni risultati precedentemente ottenuti - v. [4] e [5] - riguardanti l'urto di un martelletto rigido e di una corda elastica. Da essi possono dedursi le condizioni della corda - deformazione e atto di moto - all'istante in cui essa rimane libera dall'influenza del martelletto. È dunque possibile determinare mediante l'analisi di Fourier, i valori delle energie delle varie armoniche, i quali, com'è ben noto, determinano il timbro del suono emesso dalla corda (timbro...

Engergy decay for the quasilinear wave equation with viscosity.

Mitsuhiro Nakao (1995)

Mathematische Zeitschrift

Estensione a leggi costitutive a variabili interne dei teoremi di inadattamento in dinamica strutturale elastoplastica

Alberto Corigliano, Claudia Comi (1990)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

Si considera il problema del mancato adattamento in campo dinamico per strutture elasto-plastiche incrudenti. Si dimostrano una condizione necessaria ed una sufficiente per il verificarsi di fenomeni di inadattamento (plasticità alternata o collasso incrementale) estendendo risultati precedenti ad un'ampia classe di modelli costitutivi a variabili interne in grado di rappresentare comportamenti incrudenti non lineari.

Étude d'un modèle hyperbolique en dynamique des câbles

C. Carasso, M. Rascle, D. Serre (1985)

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

Existence and non-existence of global solutions for nonlinear hyperbolic equations of higher order

Guo Wang Chen, Shu Bin Wang (1995)

Commentationes Mathematicae Universitatis Carolinae

The existence and uniqueness of classical global solution and blow up of non-global solution to the first boundary value problem and the second boundary value problem for the equation $u_{t t} - α u_{x x} - β u_{x x t t} = ϕ {(u_{x})}_{x}$ are proved. Finally, the results of the above problem are applied to the equation arising from nonlinear waves in elastic rods $u_{t t} - [a_{0} + n a_{1} {(u_{x})}^{n - 1}] u_{x x} - a_{2} u_{x x t t} = 0 .$

Existence and uniqueness of equilibrium states of a rotating elastic rod.

Elgindi, M.B.M. (1994)

International Journal of Mathematics and Mathematical Sciences

Experimental active vibration control in truss structures considering uncertainties in system parameters.

Bueno, Douglas Domingues, Marqui, Clayton Rodrigo, Santos, Rodrigo Borges, Neto, Camilo Mesquita, Lopes, Vicente (2008)

Mathematical Problems in Engineering

Feedback controller stabilizing vibrations of a flexible cable related to an overhead crane.

Elharfi, Abdelhadi (2010)

Mathematical Problems in Engineering

Finite element formulation of forced vibration problem of a prestretched plate resting on a rigid foundation.

Eröz, M., Yildiz, A. (2007)

Journal of Applied Mathematics

Flutter panel equation in non cylindrical domain.

Clark, H.R., Ferrel, J.L., Clark, M.R. (2003)

Southwest Journal of Pure and Applied Mathematics [electronic only]

Forced periodic vibrations of an elastic system with elastico-plastic damping

Pavel Krejčí (1988)

Aplikace matematiky

We prove the existence and find necessary and sufficient conditions for the uniqueness of the time-periodic solution to the equations $u_{t t} - Δ_{x} u \pm F (u) = g (x, t)$ for an arbitrary (sufficiently smooth) periodic right-hand side $g$ , where $Δ_{x}$ denotes the Laplace operator with respect to $x \in Ω \subset R^{N}, N \geq 1$ , and $F$ is the Ishlinskii hysteresis operator. For $N = 2$ this equation describes e.g. the vibrations of an elastic membrane in an elastico-plastic medium.

Free vibration analysis of rectangular orthotropic membranes in large deflection.

Zheng, Zhou-Lian, Liu, Chang-Jiang, He, Xiao-Ting, Chen, Shan-Lin (2009)

Mathematical Problems in Engineering

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