Resolution of the piecewise smooth visible-invisible two-fold singularity in $\mathbb{R}^3$ using regularization and blowup

TL;DR

This paper addresses the longstanding problem of resolving the forward non-uniqueness of trajectories at visible-invisible two-fold singularities in 3D piecewise smooth systems by applying regularization, geometric singular perturbation theory, and blowup techniques.

Contribution

It introduces a novel regularization approach outside the Sotomayor-Teixeira class and rigorously identifies a distinguished forward orbit using geometric singular perturbation theory and blowup.

Findings

Existence of a unique forward orbit leaving the two-fold.

Attracting limit cycles can be generated through a global return mechanism.

The approach provides a rigorous resolution of non-uniqueness in 3D PWS systems.

Abstract

Two-fold singularities in a piecewise smooth (PWS) dynamical system in $\mathbb{R}^3$ have long been the subject of intensive investigation. The interest stems from the fact that trajectories which enter the two-fold are associated with forward non-uniqueness. The key questions are: How do we continue orbits forward in time? Are there orbits that are distinguished among all the candidates? We address these questions by regularizing the PWS dynamical system for the case of the visible-invisible two-fold. Within this framework, we consider a regularization function outside the class of Sotomayor and Teixera. We then undertake a rigorous investigation, using geometric singular perturbation theory and blowup. We show that there is indeed a forward orbit $U$ that is distinguished amongst all the possible forward orbits leaving the two-fold. Working with a normal form of the visible-invisible two-fold, we show that attracting limit cycles can be obtained (due to the contraction towards $U$), upon composition with a global return mechanism. We provide some illustrative examples.