Sliding mode on tangential sets of Filippov systems

Abstract

We consider piecewise smooth vector fields Z=(Z+, Z-) defined in Rn where both vector fields are tangent to the switching manifold along a submanifold M⊂ . We shall see that, under suitable assumptions, Filippov convention gives rise to a unique sliding mode on M, governed by what we call the tangential sliding vector field. Here, we will provide the necessary and sufficient conditions for characterizing such a vector field. Additionally, we prove that the tangential sliding vector field is conjugated to the reduced dynamics of a singular perturbation problem arising from the Sotomayor-Teixeira regularization of Z around M. Finally, we analyze several examples where tangential sliding vector fields can be observed, including a model for intermittent treatment of HIV.