Bifurcation of Limit Cycles from a Focus-Parabolic-Type Critical Point in Piecewise Smooth Cubic Systems

Fei Luo; Yundong Li; Yi Xiang

doi:10.3390/math12050702

Mathematics (Feb 2024)

Bifurcation of Limit Cycles from a Focus-Parabolic-Type Critical Point in Piecewise Smooth Cubic Systems

Fei Luo,
Yundong Li,
Yi Xiang

Affiliations

Fei Luo: College of Mathematics and Statistics, Sichuan University of Science and Engineering, Zigong 643000, China
Yundong Li: College of Mathematics and Statistics, Sichuan University of Science and Engineering, Zigong 643000, China
Yi Xiang: College of Mathematics and Statistics, Sichuan University of Science and Engineering, Zigong 643000, China

DOI: https://doi.org/10.3390/math12050702
Journal volume & issue: Vol. 12, no. 5
p. 702

Abstract

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In this paper, we investigate the maximum number of small-amplitude limit cycles bifurcated from a planar piecewise smooth focus-parabolic type cubic system that has one switching line given by the x-axis. By applying the generalized polar coordinates to the parabolic subsystem and computing the Lyapunov constants, we obtain 11 weak center conditions and 9 weak focus conditions at (0,0). Under these conditions, we prove that a planar piecewise smooth cubic system with a focus-parabolic-type critical point can bifurcate at least nine limit cycles. So far, our result is a new lower bound of the cyclicity of the piecewise smooth focus-parabolic type cubic system.

Published in Mathematics

ISSN: 2227-7390 (Online)
Publisher: MDPI AG
Country of publisher: Switzerland
LCC subjects: Science: Mathematics
Website: http://www.mdpi.com/journal/mathematics

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