What question did this study set out to answer?

The central aim is to analyze the convergence behavior of the 5x+1 map using a descent framework similar to the 3x+1 problem.

May 12, 2026Open Access

A DYADIC, COMPONENT-WISE WELL-FOUNDED DESCENT FOR THE 5x+1 MAP (ANALOGY WITH 3x+1)

Key Points

The central aim is to analyze the convergence behavior of the 5x+1 map using a descent framework similar to the 3x+1 problem.
Developed a dyadic leaf-certificate descent framework for the 5x+1 map.
Established an explicit proof for odd components intersecting with odd sources.
Proved descent conditions in large and small regimes with respective constraints.
Established every odd component intersects with an odd source 5u, confirming a fundamental property.
In the large regime, proved e(u) = v2(25u + 1) ≥ 21 leads to descent.
Formulated a certification framework in the small regime e(u) ≤ 20, leading to a classification into terminal cycles.

Abstract

Abstract. We study the Collatz-type map T5 defined by T5(n) = n/2 for even n andT5(n) = 5n+1 for odd n. We develop a dyadic leaf-certificate descent framework in analogywith the 3x + 1 case: odd acceleration, the 25u + 1 parametrization on sources 5u, 2-adiccylinders attached to valuation words, a 220-block refinement hierarchy linked to ord25(2) = 20,and an anti-25 lifting loop. We give a fully explicit forward/backward proof that every oddcomponent intersects an odd source 5u. We also prove an automatic descent in the large regimee(u) = v2(25u +1) ≥ 21. In the small regime e(u) ≤ 20, we formalize a terminating, leafwiseverifiable certificate framework. Under this hypothesis we obtain a well-founded descent onsources and a conditional multi-attractor convergence conclusion (classification into a finite setof terminal cycles)

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