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Even partition functions.

Ben Saïd, F.; Nicolas, J.-L. — 2002

Séminaire Lotharingien de Combinatoire [electronic only]

Sur un problème d'optimisation en nombres entiers de T.L. Saaty

J. L. Nicolas — 1975

RAIRO - Operations Research - Recherche Opérationnelle

Ordre maximal d’un élément du groupe $S_{n}$ des permutations et «highly composite numbers»

J. L. Nicolas — 1969

Bulletin de la Société Mathématique de France

On partitions without small parts

J.-L. Nicolas; A. Sárközy — 2000

Journal de théorie des nombres de Bordeaux

Let $r (n, m)$ denote the number of partitions of $n$ into parts, each of which is at least $m$ . By applying the saddle point method to the generating series, an asymptotic estimate is given for $r (n, m)$ , which holds for $n \to \infty$ , and $1 \leq m \leq c_{1} \frac{n}{{(log n)}^{c_{2}}}$ .

Sur une application de la formule de Selberg-Delange

F. Ben Saïd; J.-L. Nicolas — 2003

Colloquium Mathematicae

E. Landau has given an asymptotic estimate for the number of integers up to x whose prime factors all belong to some arithmetic progressions. In this paper, by using the Selberg-Delange formula, we evaluate the number of elements of somewhat more complicated sets. For instance, if ω(m) (resp. Ω(m)) denotes the number of prime factors of m without multiplicity (resp. with multiplicity), we give an asymptotic estimate as x → ∞ of the number of integers m satisfying $2^{ω (m)} m \leq x$ , all prime factors of m are congruent...

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Currently displaying 1 – 8 of 8

Even partition functions.

Sur un problème d'optimisation en nombres entiers de T.L. Saaty

Ordre maximal d’un élément du groupe $S_{n}$ des permutations et «highly composite numbers»

On partitions without small parts

Sur une application de la formule de Selberg-Delange

Statistiques sur $𝔽_{q} [X]$

On practical partitions.

Sommes de sous-ensembles