Paradoxical behavior in Collatz sequences

Abstract

On the set of positive integers, we consider the iterative process that maps n to either 3n+12 or n2 depending on the parity of n. The Collatz conjecture states that all such sequences eventually enter the trivial cycle (1,2). In a seminal paper, Terras further conjectured that the proportion of odd terms encountered when starting with an integer n≥2 is sufficient to determine its stopping time, namely, the number of iterations needed to descend below n. However, when iterating beyond the stopping time, there exist "paradoxical" sequences of finite length whose first term is unexpectedly exceeded, given the proportion of odd terms. In the present study, we show that this non-typical behavior is closely related to the Collatz conjecture. Furthermore, we find that it most likely occurs finitely many times, thus lending support to Terras' conjecture.