10-04
Power series with the von Mangoldt function
Preprint series: 10-04, Preprints
- MSC:
- 11L20 Sums over primes
- 11M06 $zeta (s)$ and $L(s, chi)$
Abstract: We study the analytic behavior of a power series with coefficients containing the von Mangoldt function. In particular, we extend an explicit formula of Hardy and Littlewood for related functions and derive further representation formulas in the unit disk that reveal logarithmic singularities on a dense subset of the unit circle. As an essential tool for proving the square integrability of occurring limit functions together with respective error estimates we contrib ute a new proof of a Ramanujan-like expansion of an arithmetic function consisting of the von Mangoldt function and the Euler function.
Keywords: Trigonometric series over primes, explicit formulas, arithmetic functions, Ramanujan sums, Hardy spaces.
The author(s) agree, that this abstract may be stored as full text and distributed as such by abstracting services.