AbstractBy means of the large sieve it is proved that ∑n⩽ϰ hα(−n) = ϑ(α) ϰ(α+2)2 + O(ϰ(α+2)2 − (14+ϵ) holds for every α > 0 and ϵ > 0 (h(−n) is the number of classes of primitive quadratic forms with discriminant −n).Some applications of the large sieve to certain multiplicative functions are announced
We obtain a nontrivial upper bound for almost all elements of the sequences of real numbers which ar...
AbstractIn this paper we obtain a zero density theroem for Hecke L-functions associated to cubic cha...
The large sieve method has been used extensively, beginning with Bombieri in 1965, to provide bounds...
AbstractThe purpose of this note is the following: (1) To get an upper bound for the number of monic...
AbstractThe author observes that two Hermitian forms have the same largest eigenvalue. A large sieve...
AbstractWe establish a result on the large sieve with square moduli. These bounds improve recent res...
AbstractIn this paper we modify the usual sieve methods to study the distribution of almost primes i...
We give a new proof of the arithmetic large sieve inequality based on an amplification argument, and...
AbstractIt is shown that the number of integersnfor whichn∈(x−xθ, x] andnhaving at most two prime fa...
AbstractA lower bound of Richert on the number of solutions of N − p = P3 is improved
summary:We find, via the Selberg-Delange method, an asymptotic formula for the mean of arithmetic fu...
This book is an elaboration of a series of lectures given at the Harish-Chandra Research Institute. ...
AbstractEmploying a technique introduced by Gallagher, a simple derivation is given of Montgomery's ...
We show that smooth-supported multiplicative functions ƒ are well distributed in arithmetic progress...
AbstractWe give an upper bound for some exponential sums over primes, using only sieve methods and C...
We obtain a nontrivial upper bound for almost all elements of the sequences of real numbers which ar...
AbstractIn this paper we obtain a zero density theroem for Hecke L-functions associated to cubic cha...
The large sieve method has been used extensively, beginning with Bombieri in 1965, to provide bounds...
AbstractThe purpose of this note is the following: (1) To get an upper bound for the number of monic...
AbstractThe author observes that two Hermitian forms have the same largest eigenvalue. A large sieve...
AbstractWe establish a result on the large sieve with square moduli. These bounds improve recent res...
AbstractIn this paper we modify the usual sieve methods to study the distribution of almost primes i...
We give a new proof of the arithmetic large sieve inequality based on an amplification argument, and...
AbstractIt is shown that the number of integersnfor whichn∈(x−xθ, x] andnhaving at most two prime fa...
AbstractA lower bound of Richert on the number of solutions of N − p = P3 is improved
summary:We find, via the Selberg-Delange method, an asymptotic formula for the mean of arithmetic fu...
This book is an elaboration of a series of lectures given at the Harish-Chandra Research Institute. ...
AbstractEmploying a technique introduced by Gallagher, a simple derivation is given of Montgomery's ...
We show that smooth-supported multiplicative functions ƒ are well distributed in arithmetic progress...
AbstractWe give an upper bound for some exponential sums over primes, using only sieve methods and C...
We obtain a nontrivial upper bound for almost all elements of the sequences of real numbers which ar...
AbstractIn this paper we obtain a zero density theroem for Hecke L-functions associated to cubic cha...
The large sieve method has been used extensively, beginning with Bombieri in 1965, to provide bounds...