Several models in the applied sciences are characterized by instantaneous changes in the solutions or discontinuities in the vector field. Knowledge of the geometry of interaction of the flow with the discontinuities can give new insights on the behaviour of such systems. Here, we focus on the class of the piecewise smooth systems of Filippov type. We describe some numerical techniques to locate crossing and sliding regions on the discontinuity surface, to compute the sets of attraction of these regions together with the mathematical form of the separatrices of such sets. Some numerical tests will illustrate our approach
Abstract: This paper presents an overview of the current state of the art in the analysis of discont...
We consider the fundamental matrix solution associated to piecewise smooth differential systems of F...
In this paper we consider the issue of sliding motion in Filippov systems on the intersection of two...
Several models in the applied sciences are characterized by instantaneous changes in the solutions o...
Several models in the applied sciences are characterized by instantaneous changes in the solutions o...
In this paper, we propose a novel method to analyze sliding bifurcations in discontinuous piecewise ...
In this paper, we present a novel method to analyze the behavior of discontinuous piecewise-smooth a...
In this paper, we presented a basic methodology to understand the behavior of discontinuous piecewis...
In this report, we have collected notes of work done during the Academic Year 2006-07, while the sec...
It is the purpose of this talk to present recent advances in the numerical solution of piecewise smo...
This article describes how to use smooth solvers for simulation of a class of piecewise smooth syste...
Abstract. A hybrid dynamical system with sliding is derived from a smooth n-dimensional vector field...
Multistability, or coexistence of multiple attractors, is a common and potentially dangerous propert...
The paper discusses several issues related to the numerical computation of the stable manifold of sa...
In this work, we discuss some theoretical and numerical aspects of solving differential equations w...
Abstract: This paper presents an overview of the current state of the art in the analysis of discont...
We consider the fundamental matrix solution associated to piecewise smooth differential systems of F...
In this paper we consider the issue of sliding motion in Filippov systems on the intersection of two...
Several models in the applied sciences are characterized by instantaneous changes in the solutions o...
Several models in the applied sciences are characterized by instantaneous changes in the solutions o...
In this paper, we propose a novel method to analyze sliding bifurcations in discontinuous piecewise ...
In this paper, we present a novel method to analyze the behavior of discontinuous piecewise-smooth a...
In this paper, we presented a basic methodology to understand the behavior of discontinuous piecewis...
In this report, we have collected notes of work done during the Academic Year 2006-07, while the sec...
It is the purpose of this talk to present recent advances in the numerical solution of piecewise smo...
This article describes how to use smooth solvers for simulation of a class of piecewise smooth syste...
Abstract. A hybrid dynamical system with sliding is derived from a smooth n-dimensional vector field...
Multistability, or coexistence of multiple attractors, is a common and potentially dangerous propert...
The paper discusses several issues related to the numerical computation of the stable manifold of sa...
In this work, we discuss some theoretical and numerical aspects of solving differential equations w...
Abstract: This paper presents an overview of the current state of the art in the analysis of discont...
We consider the fundamental matrix solution associated to piecewise smooth differential systems of F...
In this paper we consider the issue of sliding motion in Filippov systems on the intersection of two...