Add to ORKGThe stability and bifurcations of axially moving plates with large transverse deflections are investigated. The governing equations of an axially moving plate are derived through the D\u27Alembert\u27s principle based on von Kàrmàn\u27s nonlinear plate theory. The Galerkin metod is employed to discretize the governing partial differential equations into a set of ordinary differential equations. by a numerical method, the bifurcation diagrams are presented with respect to some parameters such as transport speed, amplitude of exciting, the ratio of the length to the width of plates and the longitudinal tension. The dynamical behaviors are identified based on the Poincaré map and the Largest Lyapunov Exponent. Periodic, quasi-periodic and even...
The present paper analyzes the dynamic behavior of a simply supported beam subjected to an axial tra...
In the present study, the nonlinear forced dynamics of an axially moving beam is investigated numeri...
This paper focuses on the bifurcation and chaos of an axially accelerating viscoelastic beam in the ...
The stability and bifurcations of an axially accelerating plate with large transverse deflections we...
The complex natural frequencies for linear free vibrations and bifurcation and chaos for forced nonl...
Nonlinear vibration characteristics of a moving membrane with variable velocity have been examined. ...
In this paper, nonlinear dynamical behavior of a rectangular plate traveled by a moving mass as well...
In this paper, nonlinear dynamical behavior of a rectangular plate traveled by a moving mass as well...
In the present study, the geometrically non-linear vibrations of thin infinitely long rectangular pl...
Bifurcation behavior of steady vibrations of cantilever plates with geometrical nonlinearities inter...
The stability of the out-of-plane vibration for axially moving thin plates with two simply supported...
The geometrically nonlinear dynamics of a three-dimensional axially moving beam is investigated nume...
The geometrically nonlinear dynamics of a three-dimensional axially moving beam is investigated nume...
A theoretical approach is presented to study nonlinear vibrations of thin infinitely long and wide r...
The present paper analyzes the dynamic behavior of a simply supported beam subjected to an axial tra...
The present paper analyzes the dynamic behavior of a simply supported beam subjected to an axial tra...
In the present study, the nonlinear forced dynamics of an axially moving beam is investigated numeri...
This paper focuses on the bifurcation and chaos of an axially accelerating viscoelastic beam in the ...
The stability and bifurcations of an axially accelerating plate with large transverse deflections we...
The complex natural frequencies for linear free vibrations and bifurcation and chaos for forced nonl...
Nonlinear vibration characteristics of a moving membrane with variable velocity have been examined. ...
In this paper, nonlinear dynamical behavior of a rectangular plate traveled by a moving mass as well...
In this paper, nonlinear dynamical behavior of a rectangular plate traveled by a moving mass as well...
In the present study, the geometrically non-linear vibrations of thin infinitely long rectangular pl...
Bifurcation behavior of steady vibrations of cantilever plates with geometrical nonlinearities inter...
The stability of the out-of-plane vibration for axially moving thin plates with two simply supported...
The geometrically nonlinear dynamics of a three-dimensional axially moving beam is investigated nume...
The geometrically nonlinear dynamics of a three-dimensional axially moving beam is investigated nume...
A theoretical approach is presented to study nonlinear vibrations of thin infinitely long and wide r...
The present paper analyzes the dynamic behavior of a simply supported beam subjected to an axial tra...
The present paper analyzes the dynamic behavior of a simply supported beam subjected to an axial tra...
In the present study, the nonlinear forced dynamics of an axially moving beam is investigated numeri...
This paper focuses on the bifurcation and chaos of an axially accelerating viscoelastic beam in the ...