Nonautonomous gradient-like ODEs on the circle: classification, structural stability and autonomization

Abstract

We study a class of scalar differential equations on the circle S1. This class is characterized mainly by the property that any solution of such an equation possesses exponential dichotomy both on the semi-axes + and +. Also we impose some other assumptions on the structure of the foliation into integral curves for such the equation. Differential equations of this class are called gradient-like ones. As a result, we describe the global behavior of the foliation, introduce a complete invariant of uniform equivalency, give standard models for the equations of the distinguished class. The case of almost periodic gradient-like equations is also studied, their classification is presented.