Exponential divisor functions

Abstract

Consider the operator E on arithmetic functions such that Ef is the multiplicative arithmetic function defined by (Ef)(pa) = f(a) for every prime power pa. We investigate the behaviour of Emτk, where τk is a k-dimensional divisor function and Em stands for the m-fold iterate of E. We estimate the error terms of Σn x Emτk(n) for various combinations of m and k. We also study properties of Emf for arbitrary f and sufficiently large m. Our study provides a unified approach to functions with exponential divisors. We improve special cases of the Dirichlet asymmetric divisor problem and several results on the exponential divisor and totient functions.