![TemplateBox[{n}, BellB]](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/58.png "TemplateBox[{n}, BellB]"){kind=small}
![TemplateBox[{n, x}, BellB2]](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/59.png "TemplateBox[{n, x}, BellB2]"){kind=small}
BellB
![TemplateBox[{n}, BellB]](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/1.png "TemplateBox[{n}, BellB]"){kind=small}
![TemplateBox[{n, x}, BellB2]](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/2.png "TemplateBox[{n, x}, BellB2]"){kind=small}
Details
- Mathematical function, suitable for both symbolic and numerical manipulation.
- The Bell polynomials satisfy the generating function relation
![e^((e^t-1)x)=sum_(n=0)^(infty)(TemplateBox[{n, x}, BellB2]t^n)/(n!)](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/3.png "e^((e^t-1)x)=sum_(n=0)^(infty)(TemplateBox[{n, x}, BellB2]t^n)/(n!)")
. - The Bell numbers are given by
![TemplateBox[{n}, BellB]=TemplateBox[{n, 1}, BellB2]](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/4.png "TemplateBox[{n}, BellB]=TemplateBox[{n, 1}, BellB2]")
. - For certain special arguments, BellB automatically evaluates to exact values.
- BellB can be evaluated to arbitrary numerical precision.
- BellB automatically threads over lists.
Background & Context
- BellB is a mathematical function that returns a Bell number or polynomial. In particular, BellB[n,x] returns the
Bell polynomial 
and BellB[n] returns the 
Bell number ![TemplateBox[{n}, BellB]=TemplateBox[{n, 1}, BellB2]](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/10.png "TemplateBox[{n}, BellB]=TemplateBox[{n, 1}, BellB2]")
. Bell polynomials can be determined from the exponential generating function 
. The Bell numbers also satisfy the recurrence relation ![B_(n+1)=sum_(k=0)^nTemplateBox[{n, k}, Binomial]B_k](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/12.png "B_(n+1)=sum_(k=0)^nTemplateBox[{n, k}, Binomial]B_k")
. The first few Bell polynomials 
are 
, while the first few Bell numbers 
are 
. - The Bell polynomial is also called an exponential polynomial or, more explicitly, the "complete exponential Bell polynomial" and is sometimes denoted
. Bell polynomials are named after mathematician and math expositor Eric Temple Bell, who wrote about them in 1934. - The polynomial
has the interpretation that if there are 
partitions of 
into 
parts, then 
. Furthermore, if there are 
total partitions of 
, then 
. For example, the set 
having 
elements can be partitioned into 
parts 
ways 
, 
part 
way (
), 
parts 
ways (
, 
and 
), and 
parts 
way (
), giving 
. Since there are five total ways to partition 
, 
. - The Bell polynomial and number are a special case of the BellY function, with
![TemplateBox[{n, x}, BellB2]=sum_(k=0)^nY_(n,k)(x,...,x)](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/45.png "TemplateBox[{n, x}, BellB2]=sum_(k=0)^nY_(n,k)(x,...,x)")
and 
. Letting ![TemplateBox[{n, k}, StirlingS2]](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/47.png "TemplateBox[{n, k}, StirlingS2]")
denote the Stirling number of the second kind, returned by StirlingS2, ![B_n=B_n(1)=sum_(k=0)^nTemplateBox[{n, k}, StirlingS2]](https://cdn.statically.io/img/reference.wolfram.com/Files/BellB.en/48.png "B_n=B_n(1)=sum_(k=0)^nTemplateBox[{n, k}, StirlingS2]")
.
Examples
open all close allScope (5)
The precision of the output tracks the precision of the input:
BellB threads element-wise over lists:
BellB can be applied to a power series:
TraditionalForm formatting:
Applications (4)
BellB numbers versus their asymptotics:
Compute the first 10 complementary Bell numbers:
Compare with an expression in terms of the Stirling number of the second kind:
Verify an expression for the Bell number in terms of a Hessenberg determinant for the first few cases:
The Bell numbers BellB[n] can be characterized as the unique set of numbers such that two certain Hankel determinants made from these numbers are both equal to BarnesG[n+2]. Verify for the first few cases:
Properties & Relations (7)
The exponential generating function for BellB:
Compare with the explicit summation formula:
Sum can give results involving BellB:
The 
moment of a PoissonDistribution is given by the 
Bell polynomial in its mean 
:
Use FullSimplify to simplify expressions involving BellB:
Compute Bell numbers directly from set partitions 
:
Use IntegerPartitions to directly sum over terms that satisfy the constraints on indices:
Compare with the result of BellB:
Compute Bell numbers using generalized Bell polynomials:
Compute Bell polynomials using generalized Bell polynomials:
FindSequenceFunction can recognize the BellB sequence:
Possible Issues (1)
The first argument of BellB must be a non-negative integer:
Text
Wolfram Research (2007), BellB, Wolfram Language function, https://reference.wolfram.com/language/ref/BellB.html.
CMS
Wolfram Language. 2007. "BellB." Wolfram Language & System Documentation Center. Wolfram Research. https://reference.wolfram.com/language/ref/BellB.html.
APA
Wolfram Language. (2007). BellB. Wolfram Language & System Documentation Center. Retrieved from https://reference.wolfram.com/language/ref/BellB.html