An order result for the exponential divisor function

Abstract

The integer d=Πi=1s pibi is called an exponential divisor of n=Πi=1s piai>1 if bi ai for every i∈ \1,2,...,s\. Let τ(e)(n) denote the number of exponential divisors of n, where τ(e)(1)=1 by convention. The aim of the present paper is to establish an asymptotic formula with remainder term for the r-th power of the function τ(e), where r 1 is an integer. This improves an earlier result of M. V. Subbarao [5].