Add to ORKGThis paper contains an elementary derivation of formulas for multiplicative functions of m which exactly yield the following numbers: the number of distinct arithmetic progressions of w reduced residues modulo m; the number of the same with first term n; the number of the same with mean n; the number of the same with common difference n. With m and odd w fixed, the values of the first two of the last three functions are fixed and equal for all n relatively prime to m; other similar relations exist among these three functions
Abstract. Strengthening work of Rosser, Schoenfeld, and McCurley, we establish explicit Chebyshev-ty...
summary:We find, via the Selberg-Delange method, an asymptotic formula for the mean of arithmetic fu...
We describe some of the machinery behind recent progress in establish-ing infinitely many arithmetic...
This paper contains an elementary derivation of formulas for multiplicative functions of m which exa...
Dedicated to Paulo Ribenboim on the occasion of his 80th birthday. RÉSUMÉ. Nous développons une théo...
Abstract: Residues to a given modulus have been introduced to mathe-matics by Carl Friedrich Gauss w...
AbstractIt is shown that certain commonly occurring conditions may be factored out of sums of multip...
We study the Mertens product over primes in arithmetic progressions, and find a uniform version of p...
We define ψ‾ to be the multiplicative arithmetic function that satisfies for all primes p...
We consider very short sums of the divisor function in arithmetic progressions prime to a fixed modu...
We consider very short sums of the divisor function in arithmetic progressions prime to a fixed modu...
AbstractWe study the Mertens product over primes in arithmetic progressions, and find a uniform vers...
We consider very short sums of the divisor function in arithmetic progressions prime to a fixed modu...
AbstractLet Nm(x) be the number of arithmetic progressions that consist of m terms, all primes and n...
We give explicit numerical values with 100 decimal digits for the constant in the Mertens product ov...
Abstract. Strengthening work of Rosser, Schoenfeld, and McCurley, we establish explicit Chebyshev-ty...
summary:We find, via the Selberg-Delange method, an asymptotic formula for the mean of arithmetic fu...
We describe some of the machinery behind recent progress in establish-ing infinitely many arithmetic...
This paper contains an elementary derivation of formulas for multiplicative functions of m which exa...
Dedicated to Paulo Ribenboim on the occasion of his 80th birthday. RÉSUMÉ. Nous développons une théo...
Abstract: Residues to a given modulus have been introduced to mathe-matics by Carl Friedrich Gauss w...
AbstractIt is shown that certain commonly occurring conditions may be factored out of sums of multip...
We study the Mertens product over primes in arithmetic progressions, and find a uniform version of p...
We define ψ‾ to be the multiplicative arithmetic function that satisfies for all primes p...
We consider very short sums of the divisor function in arithmetic progressions prime to a fixed modu...
We consider very short sums of the divisor function in arithmetic progressions prime to a fixed modu...
AbstractWe study the Mertens product over primes in arithmetic progressions, and find a uniform vers...
We consider very short sums of the divisor function in arithmetic progressions prime to a fixed modu...
AbstractLet Nm(x) be the number of arithmetic progressions that consist of m terms, all primes and n...
We give explicit numerical values with 100 decimal digits for the constant in the Mertens product ov...
Abstract. Strengthening work of Rosser, Schoenfeld, and McCurley, we establish explicit Chebyshev-ty...
summary:We find, via the Selberg-Delange method, an asymptotic formula for the mean of arithmetic fu...
We describe some of the machinery behind recent progress in establish-ing infinitely many arithmetic...