Slow--fast systems and sliding on codimension 2 switching manifolds

Abstract

In this work we consider piecewise smooth vector fields X defined in n , where is a self-intersecting switching manifold. A double regularization of X is a 2-parameter family of smooth vector fields X.η, ,η>0, satisfying that X,η converges pointwise to X on n, when ,η→ 0. We define the sliding region on the non regular part of as a limit of invariant manifolds of X.η. Since the double regularization provides a slow--fast system, the GSP-theory (geometric singular perturbation theory) is our main tool.