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P.E. McSharry and Paulo R. C. Ruffino (2003) Asymptotic angular stability in non-linear systems: rotation numbers and winding numbers Dynamical Systems An International Journal 18(3): 191-200

Abstract

The asymptotic angular stability of a dynamical system may be quantified by its rotation number or its winding number. These two quantities are shown to result from different assumptions, made about the flow generating the Poincaré map which results from the sequence of homeomorphisms in S¹. An ergodic theorem of existence a.s. of the rotation number for non-linear systems is given. The advantages and disadvantages of both the rotation and winding numbers are discussed. Numerical calculations of the distribution of rotation number and winding number arising from different initial conditions are presented for three different chaotic maps.

Keywords

Rotation number, winding number, dynamical systems, non-linear systems.