Nonlinear Sliding of Discontinuous Vector Fields and Singular Perturbation

Abstract

We consider piecewise smooth vector fields (PSVF) defined in open sets M⊂eq Rn with switching manifold being a smooth surface . The PSVF are given by pairs X = (X+, X-), with X = X+ in + and X = X- in - where + and - are the regions on M separated by . A regularization of X is a 1-parameter family of smooth vector fields Xε,ε>0, satisfying that Xε converges pointwise to X on M, when ε→ 0. Inspired by the Fenichel Theory , the sliding and sewing dynamics on the discontinuity locus can be defined as some sort of limit of the dynamics of a nearby smooth regularization Xε. While the linear regularization requires that for every ε>0 the regularized field Xε is in the convex combination of X+ and X- the nonlinear regularization requires only that Xε is in a continuous combination of X+ and X- . We prove that for both cases, the sliding dynamics on is determined by the reduced dynamics on the critical manifold of a singular perturbation problem. abstract