Effectiveness of the Bendixson-Dulac theorem

TL;DR

This paper demonstrates the power of the Bendixson-Dulac theorem in bounding the number of limit cycles in planar vector fields, introducing new applications, methods, and phenomena with simple, verifiable calculations.

Contribution

It provides novel applications of the Bendixson-Dulac theorem, including using curvature-related functions as Dulac functions and analyzing limit cycles in parametric systems with exponential bounds.

Findings

Bounded the number of limit cycles for various systems

Introduced curvature-based Dulac functions for analysis

Discovered exponential decrease in parameter intervals for limit cycles

Abstract

We illustrate with several new applications the power and elegance of the Bendixson Dulac theorem to obtain upper bounds of the number of limit cycles for several families of planar vector fields. In some cases we propose to use a function related with the curvature of the orbits of the vector field as a Dulac function. We get some general results for Lienard type equations and for rigid planar systems. We also present a remarkable phenomenon: for each integer m greater than one, we provide a simple one parametric differential system for which we prove that it has limit cycles only for the values of the parameter in a subset of an interval that decreases exponentially when m grows. One of the strengths of the results presented in this work is that although they are obtained with simple calculations, that can be easily checked by hand, they improve and extend previous studies. Another one is that, for certain systems, it is possible to reduce the question of the number of limit cycles to the study of the shape of a planar curve and the sign of an associated function in one or two variables.