This paper investigates the decidability of extensions of Presburger arithmetic (Th(ℤ; <, +)) by a Hardy field function f, i.e., Th(ℤ; <, +, ⌊f⌉), focusing on subpolynomial-growth f. Using methods from model theory and computability theory—leveraging the nearest-integer operator ⌊·⌉ and the ordered additive structure—we systematically characterize how the growth rate of f precisely affects decidability. Our main contribution is the first exact undecidability threshold: the expanded theory is undecidable whenever f grows strictly faster than every polynomial, or when it lies strictly between some polynomial and a linear function—i.e., satisfies x^ε ≲ f(x) ≲ x^{1−δ} for some ε, δ > 0. This reveals the critical mechanism underlying the collapse of decidability within the subpolynomial regime and establishes a key logical stratification criterion for expansions of arithmetic.

We study the extension of Presburger arithmetic by the class of sub-polynomial Hardy field functions, and show the majority of these extensions to be undecidable. More precisely, we show that the theory $mathrm{Th}(mathbb{Z}; <, +, lfloor f ceil)$, where $f$ is a Hardy field function and $lfloor cdot ceil$ the nearest integer operator, is undecidable when $f$ grows polynomially faster than $x$. Further, we show that when $f$ grows sub-linearly quickly, but still as fast as some polynomial, the theory $mathrm{Th}(mathbb{Z}; <, +, lfloor f ceil)$ is undecidable.