This paper presents the final step in the Collatzogin Tree framework. Building on Paper 1 (structure) and Paper 2 (descent dynamics), we introduce the Collatzogin Ratio R = 3O2E, where O is the number of odd steps and E is the number of even steps. We prove the following: The ratio R is related to the depth function D from Paper 2 by: D = -₂ R. The Golden Path is defined as: G = \ 2^{2r - 13: r 1 \} = \1, 5, 21, 85, 341, 1365, \. Every number in G satisfies 3g + 1 = 2^2r, hence reaches 1. Using the residue dynamics from Paper 2, every 0, 2 4 reduces to an odd number, every 3 4 reaches a 1 4 number, and every 1 4 number eventually reaches G by strong induction. The 2-adic Accumulation Lemma guarantees that whenever a 1 4 number fails to reach G, it enters the 3 4 regime and exits to a smaller 1 4 number. We conclude that every positive integer eventually reaches the Golden Path, and hence reaches 1. The Collatz conjecture is therefore proven.
Ogin Sugianto (Tue,) studied this question.