Add to ORKG13 pagesIt is proved that the summands of almost all unequal partitions of $n$ are well-distributed modulo $d$ for $d=o(n^{1/2})$
AbstractThe number cn of weighted partitions of an integer n, with parameters (weights) bk, k⩾1, is ...
International audienceIn this note, we improve some results of Granville \& Soundararajan on the dis...
AbstractWinkler has proved that, if n and m are positive integers with n ≤ m ≤ n25 and m ≡ n (mod 2)...
International audienceLet $d\ge 2$ be an integer. We prove that for almost all partitions of an inte...
26 pages, accepté pour publication dans le journal Functiones et approximatioInternational audienceL...
We present various results on the number of prime factors of the parts of a partition of an integer....
23 pagesIt is proved that the summands of almost all partitions of $n$ are well-distributed modulo $...
AbstractWe prove a lemma that is useful for obtaining upper bounds for the number of partitions with...
12 pagesLet $d\ge 2$ be a fixed integer. We prove that a positive proportion of partitions of an int...
AbstractLet n = n1 + n2 + … + nj a partition Π of n. One will say that this partition represents the...
AbstractIn this paper we revisit a 1987 question of Rabbi Ehrenpreis. Among many things, we provide ...
En 1940, Paul Erdős énonça une conjecture sur la distribution des classes inversibles modulo un enti...
AbstractEuler's partition theorem states that the number of partitions of an integer N into odd part...
We modify the recent method of J.-M. Deshouillers and H. Iwaniec in the theory of uniform distributi...
AbstractA new expansion is given for partial sums of Eulerʼs pentagonal number series. As a corollar...
AbstractThe number cn of weighted partitions of an integer n, with parameters (weights) bk, k⩾1, is ...
International audienceIn this note, we improve some results of Granville \& Soundararajan on the dis...
AbstractWinkler has proved that, if n and m are positive integers with n ≤ m ≤ n25 and m ≡ n (mod 2)...
International audienceLet $d\ge 2$ be an integer. We prove that for almost all partitions of an inte...
26 pages, accepté pour publication dans le journal Functiones et approximatioInternational audienceL...
We present various results on the number of prime factors of the parts of a partition of an integer....
23 pagesIt is proved that the summands of almost all partitions of $n$ are well-distributed modulo $...
AbstractWe prove a lemma that is useful for obtaining upper bounds for the number of partitions with...
12 pagesLet $d\ge 2$ be a fixed integer. We prove that a positive proportion of partitions of an int...
AbstractLet n = n1 + n2 + … + nj a partition Π of n. One will say that this partition represents the...
AbstractIn this paper we revisit a 1987 question of Rabbi Ehrenpreis. Among many things, we provide ...
En 1940, Paul Erdős énonça une conjecture sur la distribution des classes inversibles modulo un enti...
AbstractEuler's partition theorem states that the number of partitions of an integer N into odd part...
We modify the recent method of J.-M. Deshouillers and H. Iwaniec in the theory of uniform distributi...
AbstractA new expansion is given for partial sums of Eulerʼs pentagonal number series. As a corollar...
AbstractThe number cn of weighted partitions of an integer n, with parameters (weights) bk, k⩾1, is ...
International audienceIn this note, we improve some results of Granville \& Soundararajan on the dis...
AbstractWinkler has proved that, if n and m are positive integers with n ≤ m ≤ n25 and m ≡ n (mod 2)...