Computing the Topological Degree of Maps Between 2-Spheres

Abstract

We describe an effective method for computing the topological degree of continuous functions R:S2 S2, where S2 is the Riemann sphere. Our approach generalizes the degree formula for rational functions of complex polynomials, fg, without common zeros. To apply our method, it is necessary to represent the function R as the ratio of two continuous complex-valued functions f and g without common zeros. By using the Hopf fibration, this method reduces the problem to computing the winding number of a loop. This enables us to compute the degree of fg even when f and g are arbitrary continuous complex functions without common zeros, and the fraction has a limit at infinity (which can be finite or infinite). Specifically, if f and g are complex polynomials in z and z, and the highest-degree homogeneous component of the polynomial with the greater algebraic degree has a finite or infinite limit as |z|∞, then the problem reduces to counting the roots of a complex polynomial inside the unit circle, obtained from this component.