Uniform Distribution of Fractional Parts Related to Pseudoprimes

Abstract

We estimate exponential sums with the Fermat-like quotients fg(n) = gn-1 - 1n hg(n)=gn-1-1P(n), where g and n are positive integers, n is composite, and P(n) is the largest prime factor of n. Clearly, both fg(n) and hg(n) are integers if n is a Fermat pseudoprime to base g, and if n is a Carmichael number this is true for all g coprime to n. Nevertheless, our bounds imply that the fractional parts \fg(n)\ and \hg(n)\ are uniformly distributed, on average over g for fg(n), and individually for hg(n). We also obtain similar results with the functions fg(n) = gfg(n) and hg(n) = ghg(n).

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