On asymptotic behaviour of Dirichlet inverse
Abstract
Let f(n) be an arithmetic function with f(1)≠0 and let f-1(n) be its reciprocal with respect to the Dirichlet convolution. We study the asymptotic behaviour of |f-1(n)| with regard to the asymptotic behaviour of |f(n)| assuming that the latter one grows or decays with at most polynomial or exponential speed. As a by-product, we obtain simple but constructive upper bounds for the number of ordered factorizations of n into k factors.
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