On a Result of Smith and Subbarao Concerning a Divisor Problem

Werner Georg Nowak

Type: Article

Publication Date: 1984-12-01

Citations: 11

DOI: https://doi.org/10.4153/cmb-1984-080-9

Abstract

Abstract Let d ( n;l,k ) denote the number of divisors of the positive integer n which are congruent to I modulo k. The objective of the present paper is to prove that (for some exponent θ<⅓) holds uniformly in l, k and x satisfying 1≤l≤k≤x . This improves a recent result due to R. A. Smith and M. V. Subbarao [3].

Locations

Canadian Mathematical Bulletin - View - PDF

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+	The Theory of the Riemann Zeta-Function	1987	E. C. Titchmarsh D. R. Heath‐Brown
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