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Let $S$ be a non-empty subset of positive integers. A partition of a positive integer $n$ into $S$ is a finite nondecreasing sequence of positive integers $a_{1}, a_{2}, \dots, a_{r}$ in $S$ with repetitions allowed such that $\sum_{i = 1}^{r} a_{i} = n$ . Here we apply Pólya’s enumeration theorem to find the number $¶ (n; S)$ of partitions of $n$ into $S$ , and the number $D P (n; S)$ of distinct partitions of $n$ into $S$ . We also present recursive formulas for computing $¶ (n; S)$ and $D P (n; S)$ .

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A uniformly distributed statistic on a class of lattice paths.

A well-rounded linear function.

Abel's method on Summation by Parets and Nonterminating q-Series Identities.

Acyclic digraphs and eigenvalues of $(0, 1)$ -matrices.

Advanced determinant calculus.

Affine Weyl groups as infinite permutations.

Airy phenomena and analytic combinatorics of connected graphs.

Algorithmische Kombinatorik mit Kleinrechnern.

Almost product evaluation of Hankel determinants.

Alternating, pattern-avoiding permutations.

An analogue of covering space theory for ranked posets.

An application of Pólya’s enumeration theorem to partitions of subsets of positive integers

An area-to-inv bijection between Dyck paths and 312-avoiding permutations.

An asymptotic expansion for the number of permutations with a certain number of inversions.

An enumeration theorem for rooted graphs

An estimate for Frobenius' Diophantine problem in three dimensions.

An Eulerian partner for inversions.

An explanatory bijection of some properties of bridges. (Une bijection explicative de plusieurs propriétés de ponts.)

An exploration of the permanent-determinant method.

An extension of the exponential formula in enumerative combinatorics.

Currently displaying 101 – 120 of 853