On the FOD/FOM parameter of rational maps

Abstract

Let be a (right) action of PSL2( L) on the space L(z) of rational maps defined over an algebraically closed field L. If R ∈ L(z) and MR is its -field of moduli, then the parameter FOD/FOM(R) is the smallest integer n ≥ 1 such that there is a -field of definition of R being a degree n extension of MR. When L has characteristic zero and =∞ is the conjugation action, then it is known that FOD/FOM_∞(R) ≤ 2. In this paper, we study the above parameter for general actions and any characteristic.

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