Maximum number of limit cycles for Abel equation having coefficients with linear trigonometric functions

Abstract

This paper devotes to the study of the classical Abel equation dxdt=g(t)x3+f(t)x2, where g(t) and f(t) are trigonometric polynomials of degree m≥1. We are interested in the problem that whether there is a uniform upper bound for the number of limit cycles of the equation with respect to m, which is known as the famous Smale-Pugh problem. In this work we generalize an idea from the recent paper (Yu, Chen and Liu, arXiv:2304.13528, 2023) and give a new criterion to estimate the maximum multiplicity of limit cycles of the above Abel equations. By virtue of this criterion and the previous results given by \'Alvarez et al. and Bravo et al., we completely solve the simplest case of the Smale-Pugh problem, i.e., the case when g(t) and f(t) are linear trigonometric, and obtain that the maximum number of limit cycles, is three.