We show that an inverted pendulum that is balanced on a cart by linear delayed feedback control may exhibit small chaotic motion about the upside-down position. In periodic windows associated with this chaotic regime we find periodic orbits of arbitrarily high period that correspond to complex balancing motion of the pendulum with bounded velocity of the cart. This result shows that complex balancing is possible in a controlled mechanical system with a geometric nonlinearity even when the control law is only linear. This is in contrast to other proposed models that require a nonlinearity of the controller, such as round-off due to digitization. We find the complex motion by studying homoclinic bifurcations of a reduced three-dimensional vec...
The aim of the paper is a comprehensive study of the compound elastic pendulum (CEP) with two degree...
International audienceThe Belousov-Zhabotinsky (BZ) reaction can display a rich dynamics when a dela...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
We show that an inverted pendulum that is balanced on a cart by linear delayed feedback control may ...
International audienceThe use of Pyragas-Type controller proved interest in the stabilization of uns...
We investigate a delay differential equation that models a pendulum stabilized in the upright positi...
<p>We investigate a delay differential equation that models a pendulum stabilized in the upright pos...
International audienceThe paper considers the problem of stabilization of systems possessing a multi...
In this paper the dynamics of the controlled pendulum is investigated assuming backlash and time del...
In this paper we investigate the stability and the onset of chaotic oscillations around the pointing...
Analysis is conducted on a linear control system used for the stabilization of an inverted pendulum,...
Due to the character of the original source materials and the nature of batch digitization, quality ...
In this paper a robotic arm is modelled by a double pendulum excited in its base by a DC motor of li...
Chaos has an intrinsically richness related to its structure and, because of that, there are benefit...
AbstractIn this paper, we analyze the local bifurcation phenomena in a simple system described by eq...
The aim of the paper is a comprehensive study of the compound elastic pendulum (CEP) with two degree...
International audienceThe Belousov-Zhabotinsky (BZ) reaction can display a rich dynamics when a dela...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...
We show that an inverted pendulum that is balanced on a cart by linear delayed feedback control may ...
International audienceThe use of Pyragas-Type controller proved interest in the stabilization of uns...
We investigate a delay differential equation that models a pendulum stabilized in the upright positi...
<p>We investigate a delay differential equation that models a pendulum stabilized in the upright pos...
International audienceThe paper considers the problem of stabilization of systems possessing a multi...
In this paper the dynamics of the controlled pendulum is investigated assuming backlash and time del...
In this paper we investigate the stability and the onset of chaotic oscillations around the pointing...
Analysis is conducted on a linear control system used for the stabilization of an inverted pendulum,...
Due to the character of the original source materials and the nature of batch digitization, quality ...
In this paper a robotic arm is modelled by a double pendulum excited in its base by a DC motor of li...
Chaos has an intrinsically richness related to its structure and, because of that, there are benefit...
AbstractIn this paper, we analyze the local bifurcation phenomena in a simple system described by eq...
The aim of the paper is a comprehensive study of the compound elastic pendulum (CEP) with two degree...
International audienceThe Belousov-Zhabotinsky (BZ) reaction can display a rich dynamics when a dela...
We study the bifurcations associated with stability of the inverted (stationary) state in the parame...