Euler's divergent series in arithmetic progressions
Abstract
Let and m be integers satisfying 0 and m 3. We show that for any given integers a and b, b ≠ 0, there are (m)2 reduced residue classes modulo m each containing infinitely many primes p such that a-bFp() 0, where Fp()=Σn=0∞ n!n is the p-adic evaluation of Euler's factorial series at the point .
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