Zbl.No: 012.01201
Autor: Erdös, Pál; Turán, Pál
Title: Ein zahlentheoretischer Satz. (A number-theoretical theorem.) (In German)
Source: Mitteil. Forsch.-Inst. Math. Mech. Univ. Tomsk 1, 101-103 (1935).
Review: Let a be a fixed integer, and let l(k) be defined (for any k prime to a) as the least positive integer for which al(k)\equiv 1 (mod k). Generalising a result of N.P.Romanoff (Zbl 009.00801), the authors prove here that sumk {1 \over kl(k)\epsilon} converges for every \epsilon > 0. It suffices to prove that sum1/k extended over those k for which l(k) < (log k)2 \over \epsilon converges. For this it suffices that the number of divisors \leq n of (a-1) (a2-1)...(aN-1) should be O(n/ log 2 n), where N = [(log n)2 \over \epsilon]. This is proved by estimating the number of prime factors, and considering separately those divisors with more than \sqrt{log n} different prime factors and those with less.
Reviewer: Davenport (Cambridge)
Classif.: * 11B25 Arithmetic progressions 11N13 Primes in progressions
Index Words: Number theory
