Geometric singular perturbation on a positive measure minimal set of a planar piecewise smooth vector field

Carvalho, Tiago de; Gonçalves, Luiz Fernando; Freitas,  Bruno Rodrigues de

doi:10.1016/j.nahs.2025.101628

Geometric singular perturbation on a positive measure minimal set of a planar piecewise smooth vector field

Data

2025

Autores

Carvalho, Tiago de

Gonçalves, Luiz Fernando

Freitas, Bruno Rodrigues de

Resumo

In this paper, we employ the geometric theory of singular perturbations to obtain detailed insights concerning a class of piecewise smooth vector fields exhibiting a positive measure minimal set. The canonical form used in our analysis represents a larger class of piecewise smooth systems, encompassing models of discontinuous harmonic oscillators. Through a desingularization process, which entails the application of a -regularization function along with successive weighted blow-ups (directional, spherical and polar), we obtain an attractor for the trajectories of the desingularized vector field .

Palavras-chave

Discontinuous differential system, Minimal set, Singular perturbation

Citação

CARVALHO, Tiago; GONCALVES, Luiz Fernando; FREITAS, Bruno Rodrigues. Geometric singular perturbation on a positive measure minimal set of a planar piecewise smooth vector field. Nonlinear Analysis: hybrid systems, Amsterdam, v. 58, e101628, 2025. DOI: 10.1016/j.nahs.2025.101628. Disponível em: https://www.sciencedirect.com/science/article/pii/S1751570X25000548. Acesso em: 8 dez. 2025.