-bounds for the partial sums of some modified Dirichlet characters II
Abstract
A modified Dirichlet character f is a completely multiplicative function such that for some Dirichlet character , f(p)=(p) for all but a finite number of primes p∈ S, and for those exceptional primes p∈ S, |f(p)|≤ 1. If is primitive and for each p∈ S we have |f(p)|=1, we prove that Σn≤ xf(n)=(( x)(|S|-3)/2). This makes progress on a Conjecture due to Klurman, Mangerel, Pohoata and Ter\"av\"ainen, c.f. Trans. Amer. Math. Soc., 374 (2021), pp. 7967--7990. Our proof combines tools from Analytic Number Theory, Harmonic Analysis, Baker's Theory on linear forms in logarithms and Discrepancy bounds for sequences uniformly distributed modulo 1.
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