Schanuel's theorem for heights defined via extension fields

Abstract

Let k be a number field, let θ be a nonzero algebraic number, and let H(·) be the Weil height on the algebraic numbers. In response to a question by T. Loher and D. W. Masser, we prove an asymptotic formula for the number of α ∈ k with H(α θ)≤ X. We also prove an asymptotic counting result for a new class of height functions defined via extension fields of k. This provides a conceptual framework for Loher and Masser's problem and generalizations thereof. Moreover, we analyze the leading constant in our asymptotic formula for Loher and Masser's problem. In particular, we prove a sharp upper bound in terms of the classical Schanuel constant.