Difference between revisions of "Stirling numbers of the second kind"
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$$S(n,k)=\dfrac{1}{k!} \displaystyle\sum_{j=0}^{k} (-1)^{k-j} {k \choose j} j^n,$$ | $$S(n,k)=\dfrac{1}{k!} \displaystyle\sum_{j=0}^{k} (-1)^{k-j} {k \choose j} j^n,$$ | ||
where ${k \choose j}$ denotes a [[binomial coefficient]]. The Stirling numbers of the second kind appear in the definition of the [[Bell numbers]] and [[Touchard polynomial|Touchard polynomials]]. | where ${k \choose j}$ denotes a [[binomial coefficient]]. The Stirling numbers of the second kind appear in the definition of the [[Bell numbers]] and [[Touchard polynomial|Touchard polynomials]]. | ||
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+ | [[Category:SpecialFunction]] |
Latest revision as of 18:57, 24 May 2016
The Stirling numbers of the second kind, commonly written as $S(n,k)$ or $\begin{Bmatrix}n \\ k\end{Bmatrix}$ are given by $$S(n,k)=\dfrac{1}{k!} \displaystyle\sum_{j=0}^{k} (-1)^{k-j} {k \choose j} j^n,$$ where ${k \choose j}$ denotes a binomial coefficient. The Stirling numbers of the second kind appear in the definition of the Bell numbers and Touchard polynomials.