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Number of stable digits of any integer tetration

sPIqr Society, World Intelligence Network, Marco Ripà, Luca Onnis

2022Notes on Number Theory and Discrete Mathematics21 citationsDOIOpen Access PDF

Abstract

In the present paper we provide a formula that allows to compute the number of stable digits of any integer tetration base a \in {\mathbb N}_0. The number of stable digits, at the given height of the power tower, indicates how many of the last digits of the (generic) tetration are frozen. Our formula is exact for every tetration base which is not coprime to 10, although a maximum gap equal to V(a)+1 digits (where V(a) denotes the constant congruence speed of a) can occur, in the worst-case scenario, between the upper and lower bound. In addition, for every a>1 which is not a multiple of 10, we show that V(a) corresponds to the 2-adic or 5-adic valuation of a-1 or a+1, or even to the 5-adic order of a^2+1, depending on the congruence class of a modulo 20.

Topics & Concepts

MathematicsCoprime integersModuloCombinatoricsCongruence (geometry)Integer (computer science)Upper and lower boundsBase (topology)Discrete mathematicsMultipleValuation (finance)ArithmeticMathematical analysisGeometryComputer scienceEconomicsProgramming languageFinanceComputability, Logic, AI AlgorithmsQuantum Computing Algorithms and ArchitecturePolynomial and algebraic computation
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