We give a new upper bound of Barban-Davenport-Halberstam type for twins of k-free numbers in arithmetic progressions.MathematicsSCI(E)0ARTICLE3223-25313
AbstractWe obtain upper and lower bounds for the size of a largest family of 3-term arithmetic progr...
ABSTRAOT. The 'main purpose of this paper is to study the distribution properties of k-power fr...
Abstract. For a fixed number field K, we consider the mean square error in estimating the number of ...
In this paper we obtain an improved asymptotic formula on the frequency of k-free numbers with a giv...
AbstractIn this paper we obtain an improved asymptotic formula on the frequency of k-free numbers wi...
An asymptotic formula for variance of tuples of k-free numbers in arithmetic progression
We obtain various bounds for the L^1 and L^2 norms of the exponential sums over the twins of k-free ...
Title: Roth's theorem on arithmetic progressions Author: Michal Krkavec Department: Department of Ap...
Abstract Let Fk denotes the set of k-free number. For any positive integers l ≥ 2, we define a numbe...
We obtain upper and lower bounds for the size of a largest family of 3-term arithmetic progressions ...
Let u amd a be coprime positive integers. Put, for a non-zero integer k, ψ(x; q, a, 2k)=Σ Λ(m)Λ(n) ...
AbstractThe author gives remainder estimates for squarefree integers in arithmetic progressions corr...
In the paper, new upper bounds in the second Kershaw’s double inequality and its generalizations in...
A positive integer m is a practical number if every positive integer n is a sum of distinct divisor...
In the paper, new upper bounds in the second Kershaw’s double\ud inequality and its generalizations ...
AbstractWe obtain upper and lower bounds for the size of a largest family of 3-term arithmetic progr...
ABSTRAOT. The 'main purpose of this paper is to study the distribution properties of k-power fr...
Abstract. For a fixed number field K, we consider the mean square error in estimating the number of ...
In this paper we obtain an improved asymptotic formula on the frequency of k-free numbers with a giv...
AbstractIn this paper we obtain an improved asymptotic formula on the frequency of k-free numbers wi...
An asymptotic formula for variance of tuples of k-free numbers in arithmetic progression
We obtain various bounds for the L^1 and L^2 norms of the exponential sums over the twins of k-free ...
Title: Roth's theorem on arithmetic progressions Author: Michal Krkavec Department: Department of Ap...
Abstract Let Fk denotes the set of k-free number. For any positive integers l ≥ 2, we define a numbe...
We obtain upper and lower bounds for the size of a largest family of 3-term arithmetic progressions ...
Let u amd a be coprime positive integers. Put, for a non-zero integer k, ψ(x; q, a, 2k)=Σ Λ(m)Λ(n) ...
AbstractThe author gives remainder estimates for squarefree integers in arithmetic progressions corr...
In the paper, new upper bounds in the second Kershaw’s double inequality and its generalizations in...
A positive integer m is a practical number if every positive integer n is a sum of distinct divisor...
In the paper, new upper bounds in the second Kershaw’s double\ud inequality and its generalizations ...
AbstractWe obtain upper and lower bounds for the size of a largest family of 3-term arithmetic progr...
ABSTRAOT. The 'main purpose of this paper is to study the distribution properties of k-power fr...
Abstract. For a fixed number field K, we consider the mean square error in estimating the number of ...
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