Recovering affine-linearity of functions from their restrictions to affine lines

Abstract

Motivated by recent results of Tao-Ziegler [Discrete Anal. 2016] and Greenfeld-Tao (2022 preprint) on concatenating affine-linear functions along subgroups of an abelian group, we show three results on recovering affine-linearity of functions f : V W from their restrictions to affine lines, where V,W are F-vector spaces and V ≥slant 2. First, if V < |F| and f : V F is affine-linear when restricted to affine lines parallel to a basis and to certain "generic" lines through 0, then f is affine-linear on V. (This extends to all modules M over unital commutative rings R with large enough characteristic.) Second, we explain how a classical result attributed to von Staudt (1850s) extends beyond bijections: if f : V W preserves affine lines , and if f(v) ∈ f() whenever v ∈ , then this also suffices to recover affine-linearity on V, but up to a field automorphism. In particular, if F is a prime field Z/pZ (p>2) or Q, or a completion Qp or R, then f is affine-linear on V. We then quantitatively refine our first result above, via a weak multiplicative variant of the additive Bh-sets initially explored by Singer [Trans. Amer. Math. Soc. 1938], Erdos-Turan [J. London Math. Soc. 1941], and Bose-Chowla [Comment. Math. Helv. 1962]. Weak multiplicative Bh-sets occur inside all rings with large enough characteristic, and in all infinite or large enough finite integral domains/fields. We show that if R is among any of these classes of rings, and M = Rn for some n ≥slant 3, then one requires affine-linearity on at least n n/2 -many generic lines to deduce the global affine-linearity of f on Rn. Moreover, this bound is sharp.

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