On moments of the error term of the multivariable k-th divisor functions

Abstract

Suppose k≥slant3 is an integer. Let τk(n) be the number of ways n can be written as a product of k fixed factors. For any fixed integer r≥slant2, we have the asymptotic formula equation* Σn1,·s,nr≤slant xτk(n1 ·s nr)=xrΣ=0r(k-1)dr,k,( x)+O(xr-1+αk+), equation* where dr,k, and 0<αk<1 are computable constants. In this paper we study the mean square of r,k(x) and give upper bounds for k≥slant4 and an asymptotic formula for the mean square of r,3(x). We also get an upper bound for the third power moment of r,3(x). Moreover, we study the first power moment of r,3(x) and then give a result for the sign changes of it.

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