Abel Summation of Ramanujan-Fourier Series

Abstract

Using Abel summation the paper proves a weak form of the Wiener-Khinchin formula for arithmetic functions with point-wise convergent Ramanujan-Fourier expansions. The main result is that the convolution of most arithmetic functions possessing an R-F expansion are Abel-summable to a result involving only the Ramanujan-Fourier coefficients of the R-F expansion(s).Comment: 13 pages. No Figures. Updated the definitions and made the theorem on uniform convergence more explici