Regularization of Discontinuous Foliations: Blowing up and Sliding Conditions via Fenichel Theory

Abstract

We study the regularization of an oriented 1-foliation F on M where M is a smooth manifold and ⊂ M is a closed subset, which can be interpreted as the discontinuity locus of F. In the spirit of Filippov's work, we define a sliding and sewing dynamics on the discontinuity locus as some sort of limit of the dynamics of a nearby smooth 1-foliation and obtain conditions to identify whether a point belongs to the sliding or sewing regions.