The space of rational maps on P1

Abstract

The set of morphisms :11 of degree d is parametrized by an affine open subset d of 2d+1. We consider the action of~2 on d induced by the conjugation action\/ of 2 on rational maps; that is, f∈2 acts on~ via f=f-1 f. The quotient space d=d/2 arises very naturally in the study of discrete dynamical systems on~1. We prove that~d exists as an affine integral scheme over~, that 2 is isomorphic to~2, and that the natural completion of~2 obtained using geometric invariant theory is isomorphic to~2. These results, which generalize results of Milnor over~, should be useful for studying the arithmetic properties of dynamical systems.

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