On algebraic curves A(x)-B(y)=0 of genus zero

Abstract

Using a geometric approach involving Riemann surface orbifolds, we provide lower bounds for the genus of an irreducible algebraic curve of the form EA,B:\, A(x)-B(y)=0, where A, B∈ C(z). We also investigate "series" of curves EA,B of genus zero, where by a series we mean a family with the "same" A. We show that for a given rational function A a sequence of rational functions Bi, such that deg\, Bi → ∞ and all the curves A(x)-Bi(y)=0 are irreducible and have genus zero, exists if and only if the Galois closure of the field extension C(z)/ C(A) has genus zero or one.