An Explicit Near-Conjugacy Between the Collatz Map and a Circle Rotation

Abstract

We introduce an explicit logarithmic transformation T(x) = \6(x + 1/5)\ under which the Collatz map becomes a rigid circle rotation by the irrational angle \(α = 6 3\), perturbed by a uniformly bounded error term. We prove that for all positive integers \(x\), T(C(x)) = T(x) + α + (x) 1, where \(|(x)| 0.2749\) and \((x) = O(1/x)\) as \(x ∞\). We derive the transformation from an exact functional equation linking the even and odd branches of the Collatz map, explain the arithmetic origin of the parameters \(6\) and \(1/5\), and analyse the structure of the resulting error term. Extensive numerical computations up to \(1012\) confirm the sharpness of the bounds and show that cumulative errors remain uniformly bounded along all tested trajectories. While this near-conjugacy does not by itself resolve the Collatz conjecture, it provides a concrete and quantitative dynamical framework that clarifies the geometric structure underlying the Collatz iteration and may be useful in further analytical or experimental investigations of Collatz-type systems.