Heights and morphisms in number fields

Abstract

We give a formula with explicit error term for the number of K-rational points P satisfying H(f(P)) X as X ∞, where f is a nonconstant morphism between projective spaces defined over a number field K and H is the absolute multiplicative Weil height. This yields formulae for the counting functions of f(Pm(K)) with respect to the Weil height as well as of Pm(K) with respect to the Call-Silverman canonical height.

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