Add to ORKGA nonlinear system of partial differential equations is presented to model the vertical motions of the roadbed and main cable of suspension bridge. The model is subjected to periodic forcing and numerical methods are presented for the computation of the periodic responses in the system. Newton\u27s method, continuation algorithms and Floquet theory are used to produce bifurcation diagrams which capture the multiplicity and stability of the periodic solutions. Separable solutions are investigated using methods for ordinary differential equations while general solutions are investigated using a finite difference scheme and an implicit-explicit initial value solver. The method of steepest descent is used to find entirely new branches of period...
The paper presents a planar multi-body system which synthetically describes the geometrically nonlin...
Abstract. We show the existence of the nontrivial periodic so-lution for a class of the system of th...
In this paper we explore the numerical study. of the Nonlinear Behavior of Suspension Bridge Models....
A nonlinear system of partial differential equations is presented to model the vertical motions of t...
We present an ordinary differential equation which models the torsional motion of a horizontal cross...
AbstractIn this paper, we study periodic oscillations in a suspension bridge system governed by the ...
AbstractThe paper is concerned with the existence of periodic solutions for the Lazer–McKenna suspen...
We consider a nonlinear model for time-periodic oscillations of a suspension bridge. Under some ...
Recent developments in computational technology have led to independence from oversimplification in ...
summary:We prove the existence of weak T-periodic solutions for a nonlinear mathematical model assoc...
Suspension bridges have a history of large-scale oscillations caused by wind, earthquake or traffic ...
AbstractWe look for time-periodic solutions of the suspension bridge equation. Lazer and McKenna sho...
A new method for analyzing nonlinear steady-state dynamic response of three-dimensional sagged stay ...
Abstract This paper deals with a coupled nonlinear beam-wave system, proposed by Lazer and McKenna, ...
AbstractNonlinear planar oscillations of suspended cables subjected to external excitations with thr...
The paper presents a planar multi-body system which synthetically describes the geometrically nonlin...
Abstract. We show the existence of the nontrivial periodic so-lution for a class of the system of th...
In this paper we explore the numerical study. of the Nonlinear Behavior of Suspension Bridge Models....
A nonlinear system of partial differential equations is presented to model the vertical motions of t...
We present an ordinary differential equation which models the torsional motion of a horizontal cross...
AbstractIn this paper, we study periodic oscillations in a suspension bridge system governed by the ...
AbstractThe paper is concerned with the existence of periodic solutions for the Lazer–McKenna suspen...
We consider a nonlinear model for time-periodic oscillations of a suspension bridge. Under some ...
Recent developments in computational technology have led to independence from oversimplification in ...
summary:We prove the existence of weak T-periodic solutions for a nonlinear mathematical model assoc...
Suspension bridges have a history of large-scale oscillations caused by wind, earthquake or traffic ...
AbstractWe look for time-periodic solutions of the suspension bridge equation. Lazer and McKenna sho...
A new method for analyzing nonlinear steady-state dynamic response of three-dimensional sagged stay ...
Abstract This paper deals with a coupled nonlinear beam-wave system, proposed by Lazer and McKenna, ...
AbstractNonlinear planar oscillations of suspended cables subjected to external excitations with thr...
The paper presents a planar multi-body system which synthetically describes the geometrically nonlin...
Abstract. We show the existence of the nontrivial periodic so-lution for a class of the system of th...
In this paper we explore the numerical study. of the Nonlinear Behavior of Suspension Bridge Models....