We consider a four-dimensional Hamiltonian system representing the reduced-order (two-mode) dynamics of a buckled beam, where the nonlinearity comes from the axial deformation in moderate displacements, according to classical theories. The system has a saddle-center equilibrium point, and we pay attention to the existence and detection of the stable-unstable nonlinear manifold and of homoclinic solutions, which are the sources of complex and chaotic dynamics observed in the system response. The system has also a coupling nonlinear parameter, which depends on the boundary conditions, and is zero, e.g., for the beam hinged-hinged ends and different from zero, e.g., for the beam fixed-fixed ends. The invariant manifold in the latter case is de...
We consider a Hamiltonian system with 2 degrees of freedom, with a hyperbolic equilibrium point havi...
The dynamics of 1 or 2-dimensional structures such as rods, beams, plates, etc., is usually describe...
We study the existence of homoclic solutions for reversible Hamiltonian systems taking the family of...
This work deals with the detection of homoclinic orbits of systems having a large number of degrees ...
This article extends a review in [9] of the theory and application of homoclinic orbits to equilibri...
A computational procedure that allows the detection of a new type of high-dimensional chaotic saddle...
We consider a Hamiltonian system with 2 degrees of freedom, with a hyperbolic equilibrium point havi...
AbstractThis paper presents a geometric analysis of bifurcations leading to chaos for Hamiltonian sy...
AbstractWe study bifurcations of homoclinic orbits to hyperbolic saddle equilibria in a class of fou...
We consider a perturbation of an integrable Hamiltonian vector field with three degrees of freedom w...
Abstract-This paper deals with the global stability of the long term dynamics of nonlinear mechanica...
The aim of the paper is a comprehensive study of the compound elastic pendulum (CEP) with two degree...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
The goal of this thesis is the study of homoclinic orbits in conservative systems (area-preserving m...
This paper deals with the global stability of the long term dynamics of nonlinear mechanical systems...
We consider a Hamiltonian system with 2 degrees of freedom, with a hyperbolic equilibrium point havi...
The dynamics of 1 or 2-dimensional structures such as rods, beams, plates, etc., is usually describe...
We study the existence of homoclic solutions for reversible Hamiltonian systems taking the family of...
This work deals with the detection of homoclinic orbits of systems having a large number of degrees ...
This article extends a review in [9] of the theory and application of homoclinic orbits to equilibri...
A computational procedure that allows the detection of a new type of high-dimensional chaotic saddle...
We consider a Hamiltonian system with 2 degrees of freedom, with a hyperbolic equilibrium point havi...
AbstractThis paper presents a geometric analysis of bifurcations leading to chaos for Hamiltonian sy...
AbstractWe study bifurcations of homoclinic orbits to hyperbolic saddle equilibria in a class of fou...
We consider a perturbation of an integrable Hamiltonian vector field with three degrees of freedom w...
Abstract-This paper deals with the global stability of the long term dynamics of nonlinear mechanica...
The aim of the paper is a comprehensive study of the compound elastic pendulum (CEP) with two degree...
We describe new methods for initializing the computation of homoclinic orbits for maps in a state sp...
The goal of this thesis is the study of homoclinic orbits in conservative systems (area-preserving m...
This paper deals with the global stability of the long term dynamics of nonlinear mechanical systems...
We consider a Hamiltonian system with 2 degrees of freedom, with a hyperbolic equilibrium point havi...
The dynamics of 1 or 2-dimensional structures such as rods, beams, plates, etc., is usually describe...
We study the existence of homoclic solutions for reversible Hamiltonian systems taking the family of...