Uniform bounds for fields of definition in projective spaces
Abstract
We give a positive answer to a question of J. Doyle and J. Silverman about fields of definition of dynamical systems on Pn. We prove that, for fixed n, there exists a constant Cn such that every dynamical system Pnn is defined over an extension of degree Cn of the field of moduli. More generally, the same bound works for any kind of "algebraic structure" defined over Pn, such as embedded curves, hypersurfaces, algebraic cycles. As a consequence we prove that, if x∈ X(k) is a rational point of an n-dimensional variety with quotient singularities, there exists a field extension k'/k of degree Cn-1 such that x lifts to a k'-rational point of any resolution of singularities.
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