Euler's Function on Products of Primes in Progressions

Abstract

We study generalizations of some results of Jean-Louis Nicolas regarding the relation between small values of Euler's function (n) and the Riemann Hypothesis. Among other things, we prove that for 1≤ q≤ 10 and for q=12, 14, the generalized Riemann Hypothesis for the Dedekind zeta function of the cyclotomic field Q(e2π i/q) is true if and only if for all integers k≥ 1 we have \[Nk(Nk)(((q)Nk))1(q) > 1C(q,1).\] Here Nk is the product of the first k primes in the arithmetic progression p 1~( mod~q) and C(q, 1) is the constant appearing in the asymptotic formula \[Πp ≤ x \\ p 1~( mod~q) (1 - 1p) C(q, 1)(x)1(q),\] as x→∞. We also prove that, for q≤ 400,000 and integers a coprime to q, the analogous inequality \[Nk(Nk)(((q)Nk))1(q) > 1C(q,a)\] holds for infinitely many values of k. If in addition a is a not a square modulo q, then there are infinitely many k for which this inequality holds and also infinitely many k for which this inequality fails.