A Tits alternative for rational functions
Abstract
We prove an analog of the Tits alternative for rational functions. In particular, we show that if S is a finitely generated semigroup of rational functions over the complex numbers, then either S has polynomially bounded growth or S contains a nonabelian free semigroup. We also show that if f and g are polarizable maps over any field that do not have the same set of preperiodic points, then the semigroup generated by f and g contains a nonabelian free semigroup.
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