Add to ORKGAbstract. In this paper we consider a non-smooth vector field Z = (X,Y), where X,Y are linear vector fields in dimension 3 and the discontinuity man-ifold Σ of Z is or the usual embedded torus or the unitary sphere at origin. We suppose that Σ is a sliding (stable/unstable) manifold with tangencies, by considering X,Y inelastic over Σ. In each case, we study the tangencies of the vector field Z with Σ and describe the behavior of the trajectories of the sliding vector field over Σ: they are basically closed. 1
The main aim of this paper is to study the behavior of the so called Sliding Vector Fields around an...
In this work we describe the qualitative behavior of generic discontinuous vector fields around a po...
In this thesis, we study the Filippov moments solution for differential equations with discontinuous...
We consider a differential equation p over dot = X(p), p is an element of R-3, with discontinuous ri...
We consider a differential equation ˙p = X(p), p ϵ R3 with discontinuous right-hand side and discont...
In this paper vector fields around the origin in dimension three which are approximations of discont...
Singular perturbations problems in dimension three which are approximations of discontinuous vector ...
In this paper, we consider selection of a sliding vector field of Filippov type on a discontinuity m...
In this paper, we consider selection of a sliding vector field of Filippov type on a discontinuity m...
We consider sliding motion, in the sense of Filippov, on a discontinuity surface σ of co-dimension 2...
We consider sliding motion, in the sense of Filippov, on a discontinuity surface σ of co-dimension 2...
Singular perturbations problems in dimension three which are approximations of discontinuous vector ...
In this work, we consider a special choice of sliding vector field on the intersection of two co-dim...
This paper concerns differential equation systems on R(n) with discontinuous right-hand sides. We de...
In this work, we consider a special choice of sliding vector field on the intersection of two co-dim...
The main aim of this paper is to study the behavior of the so called Sliding Vector Fields around an...
In this work we describe the qualitative behavior of generic discontinuous vector fields around a po...
In this thesis, we study the Filippov moments solution for differential equations with discontinuous...
We consider a differential equation p over dot = X(p), p is an element of R-3, with discontinuous ri...
We consider a differential equation ˙p = X(p), p ϵ R3 with discontinuous right-hand side and discont...
In this paper vector fields around the origin in dimension three which are approximations of discont...
Singular perturbations problems in dimension three which are approximations of discontinuous vector ...
In this paper, we consider selection of a sliding vector field of Filippov type on a discontinuity m...
In this paper, we consider selection of a sliding vector field of Filippov type on a discontinuity m...
We consider sliding motion, in the sense of Filippov, on a discontinuity surface σ of co-dimension 2...
We consider sliding motion, in the sense of Filippov, on a discontinuity surface σ of co-dimension 2...
Singular perturbations problems in dimension three which are approximations of discontinuous vector ...
In this work, we consider a special choice of sliding vector field on the intersection of two co-dim...
This paper concerns differential equation systems on R(n) with discontinuous right-hand sides. We de...
In this work, we consider a special choice of sliding vector field on the intersection of two co-dim...
The main aim of this paper is to study the behavior of the so called Sliding Vector Fields around an...
In this work we describe the qualitative behavior of generic discontinuous vector fields around a po...
In this thesis, we study the Filippov moments solution for differential equations with discontinuous...