Published April 24, 2025 | Version V10

A Compact Notation for Peculiar Properties Characterizing Integer Tetration

  • 1. Independent Researcher

Description

By initially working in the decimal numeral system, we introduce a compact notation to express the congruence speed of an integer tetration base \(a\), along with the cycle of the rightmost non-stable digits of \(^{b}a\) for unit increments of \(b\). The resulting discrete function provides a useful tool for efficiently computing the exact number of frozen digits that characterize the right tail of each nontrivial integer tetration. We also establish an improved upper bound for the minimum hyperexponent \(\bar{b}(a)\) that guarantees the constancy of the congruence speed of \(a\) for all heights \(b \geq \bar{b}(a)\). Moreover, we prove that the minimum between the constant congruence speeds of any two integers greater than \(1\), whose product is not divisible by \(10\), is always less than or equal to the constant congruence speed of their product. Additionally, still assuming radix-\(10\), we give examples of infinitely many perfect powers whose degree matches their constant congruence speed at every height above \(2\), emphasizing the peculiar recurrence relations of hyper-\(4\). Finally, Appendix B generalizes the described radix-\(10\) framework to all squarefree numeral systems, showing that only in such systems the congruence speed stabilizes to a fixed (positive) value for all \(a>1\) not divisible by the radical of the radix. Furthermore, we derive compact formulas for all prime-radix numeral systems and for the composite squarefree senary case.

Notes (English)

This version reorganizes the conjectural content of the preprint by refining the former Conjecture 3.2 and relocating it to the end of Section 2, thereby improving the logical coherence of the discussion on squarefree versus non-squarefree radices. Additional stylistic and typographical improvements have also been applied.

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Additional details

Dates

Available
2025-04-24
Version 1 – Without Appendix B (decimal-only framework)
Updated
2025-11-28
Version 6 – Appendix B improved (added new Remark 4).
Updated
2025-12-22
Version 7 – Remark 7 added
Updated
2025-12-23
Version 8 – notations simplified in Remarks 4 and 7; typo fixed in Remark 7
Updated
2025-12-31
Version 9 – appendix cross-references fixed
Updated
2026-02-01
Version 10 – minor conjectural reorganization; style and layout improved