Add to ORKGWe estimate the density of integers which have more than one divisor in an interval (y, z] with z ≈ y + y/(log y)log 4−1. As a consequence, we determine the precise range of z such that most integers which have at least one divisor in (y, z] have exactly one such divisor. 1
AbstractAn elementary construction of a sequence of positive integers is given. The sequence settles...
On étudie les lois de répartition des diviseurs des entiers du crible d'Eratostène et les lois de ré...
It is shown under Schinzel's Hypothesis that for a given l≥ 1, there are infinitely many k such that...
International audienceIn this paper we study the distribution of pairs (d1, d2) of positive integers...
In this paper we sharpen Hildebrand’s earlier result on a conjecture of Erdos on limit points of t...
71 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2007.We investigate several problem...
For more than 2,000 years, mathematicians have studied the “sum of divisors” function σ(n). To give ...
AbstractLet 1=d1(n)<d2(n)<⋯<dτ(n)=n be the sequence of all positive divisors of the integer n in inc...
RésuméLet 1=d1(n)<d2(n)<…<dτ(n)=n be the sequence of all the divisors of the integer n in increasing...
AbstractLet d(n) denote the number of positive integers dividing the positive integer n. We show tha...
AbstractLet 1=d1(n)<d2(n)<⋯<dτ(n)=n be the sequence of all positive divisors of the integer n in inc...
International audienceWe study the distribution of those integers all of whose prime power divisors ...
Motivated by an old question investigated by Erd\H{o}s (colloquially referred to as the ''Multiplica...
AbstractThis note is a sequel to an earlier paper of the same title that appeared in this journal. W...
Cette thèse est consacrée à l'étude de la répartition de trois ensembles de nombres entiers caractér...
AbstractAn elementary construction of a sequence of positive integers is given. The sequence settles...
On étudie les lois de répartition des diviseurs des entiers du crible d'Eratostène et les lois de ré...
It is shown under Schinzel's Hypothesis that for a given l≥ 1, there are infinitely many k such that...
International audienceIn this paper we study the distribution of pairs (d1, d2) of positive integers...
In this paper we sharpen Hildebrand’s earlier result on a conjecture of Erdos on limit points of t...
71 p.Thesis (Ph.D.)--University of Illinois at Urbana-Champaign, 2007.We investigate several problem...
For more than 2,000 years, mathematicians have studied the “sum of divisors” function σ(n). To give ...
AbstractLet 1=d1(n)<d2(n)<⋯<dτ(n)=n be the sequence of all positive divisors of the integer n in inc...
RésuméLet 1=d1(n)<d2(n)<…<dτ(n)=n be the sequence of all the divisors of the integer n in increasing...
AbstractLet d(n) denote the number of positive integers dividing the positive integer n. We show tha...
AbstractLet 1=d1(n)<d2(n)<⋯<dτ(n)=n be the sequence of all positive divisors of the integer n in inc...
International audienceWe study the distribution of those integers all of whose prime power divisors ...
Motivated by an old question investigated by Erd\H{o}s (colloquially referred to as the ''Multiplica...
AbstractThis note is a sequel to an earlier paper of the same title that appeared in this journal. W...
Cette thèse est consacrée à l'étude de la répartition de trois ensembles de nombres entiers caractér...
AbstractAn elementary construction of a sequence of positive integers is given. The sequence settles...
On étudie les lois de répartition des diviseurs des entiers du crible d'Eratostène et les lois de ré...
It is shown under Schinzel's Hypothesis that for a given l≥ 1, there are infinitely many k such that...