On intersections of fields of rational functions

Abstract

Let X and Y be rational functions of degree at least two with complex coefficients such that C(X,Y)=C(z). We study the problem of determining when the field extension [C(z):C(X)(Y)] is finite and attains the minimal possible degree deg X· deg Y. We give a complete characterization in the case where X is a Galois covering. We also establish several related results concerning the functional equation A X = Y B in rational functions, in the case where one of the functions involved is a Galois covering. Finally, we consider an analogous problem for holomorphic maps between compact Riemann surfaces.

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