Some asymptotic formulae involving Cohen-Ramanujan expansions
Abstract
Cohen-Ramanujan sum, denoted by crs(n), is an exponential sum similar to the Ramanujan sum cr(n):=Σh=1\\(h,r)=1re2π i n hr. An arithmetical function f is said to admit a Cohen-Ramanujan expansion f(n):=Σrf(r)crs(n) if the series on the right hand side converges for suitable complex numbers f(r). Given two arithmetical functions f and g with absolutely convergent Cohen-Ramanujan expansions, we derive an asymptotic formula for the sum Σn≤ Nf(n)g(n+h) where h is a fixed non negative integer. We also provide Cohen-Ramanujan expansions for certain functions to illustrate some of the results we prove consequently.
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