Distribution of θ-powers and their sums

Abstract

We refine a remark of Steinerberger (2024), proving that for α ∈ R, there exists integers 1 ≤ b1, …, bk ≤ n such that \[ \| Σj=1k bj - α \| = O(n-γk), \] where γk ≥ (k-1)/4, γ2 = 1, and γk = k/2 for k = 2m - 1. We extend this to higher-order roots. Building on the Bambah-Chowla theorem, we study gaps in \xθ+yθ: x,y∈ N\0\\, yielding a modulo one result with γ2 = 1 and bounded gaps for θ = 3/2. Given (m) ≥ 0 with Σm=1∞ (m)/m < ∞, we show that the number of solutions to \[ |Σj=1k ajθ - b| ≤ (\|(a1, …, ak)\|∞)\|(a1, …, ak)\|∞k, \] in the variables ((aj)j=1k,b) ∈ Nk+1 is finite for almost all θ>0. We also identify exceptional values of θ, resolving a question of Dubickas (2024), by proving the existence of a transcendental τ for which \|nτ\| ≤ nv has infinitely many solutions for any v ∈ R.

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