On rational functions with more than three branch points
Abstract
Let be a collection of partitions of a positive integer d of the form (a1,·s, ap),\,(b1,·s, bq),\,(m1+1,1,·s,1),·s, (ml+1,1,·s,1), where (m1,·s, ml) is a partition of p+q-2>0. We prove that there exists a rational function on the Riemann sphere C with branch data if and only if (m1,·s,ml) < d GCD(a1,·s, ap,b1,·s, bq). As an application, we give a new class of branch data which can be realized by Belyi functions on the Riemann sphere.
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