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In combinatorial mathematics, the Bell numbers count the possible partitions of a set. These numbers have been studied by mathematicians since the 19th century, and their roots go back to medieval Japan. In an example of Stigler's law of eponymy, they are named after Eric Temple Bell, who wrote about them in the 1930s. The Bell numbers are denoted B_n, where n is an integer greater than or equal to zero. Starting with B_0 = B_1 = 1, the first few Bell numbers are :1, 1, 2, 5, 15, 52, 203, 877, 4140, ... . The Bell number B_n counts the number of different ways to partition a set that has exactly n elements, or equivalently, the number of
equivalence relation In mathematics, an equivalence relation is a binary relation that is reflexive, symmetric and transitive. The equipollence relation between line segments in geometry is a common example of an equivalence relation. Each equivalence relation ...
s on it. B_n also counts the number of different rhyme schemes for n -line poems. As well as appearing in counting problems, these numbers have a different interpretation, as moments of
probability distribution In probability theory and statistics, a probability distribution is the mathematical function that gives the probabilities of occurrence of different possible outcomes for an experiment. It is a mathematical description of a random phenomenon i ...
s. In particular, B_n is the n -th moment of a Poisson distribution with mean 1.


Counting


Set partitions

In general, B_n is the number of partitions of a set of size n. A partition of a set S is defined as a family of nonempty, pairwise disjoint subsets of S whose union is S. For example, B_3 = 5 because the 3-element set \ can be partitioned in 5 distinct ways: :\ :\ :\ :\ :\. As suggested by the set notation above, the ordering of subsets within the family is not considered; ordered partitions are counted by a different sequence of numbers, the ordered Bell numbers. B_0 is 1 because there is exactly one partition of the
empty set In mathematics, the empty set is the unique set having no elements; its size or cardinality (count of elements in a set) is zero. Some axiomatic set theories ensure that the empty set exists by including an axiom of empty set, while in other ...
. This partition is itself the empty set; it can be interpreted as a family of subsets of the empty set, consisting of zero subsets. It is vacuously true that all of the subsets in this family are non-empty subsets of the empty set and that they are pairwise disjoint subsets of the empty set, because there are no subsets to have these unlikely properties. The partitions of a set correspond one-to-one with its
equivalence relation In mathematics, an equivalence relation is a binary relation that is reflexive, symmetric and transitive. The equipollence relation between line segments in geometry is a common example of an equivalence relation. Each equivalence relation ...
s. These are
binary relation In mathematics, a binary relation associates elements of one set, called the ''domain'', with elements of another set, called the ''codomain''. A binary relation over Set (mathematics), sets and is a new set of ordered pairs consisting of ele ...
s that are reflexive, symmetric, and transitive. The equivalence relation corresponding to a partition defines two elements as being equivalent when they belong to the same partition subset as each other. Conversely, every equivalence relation corresponds to a partition into
equivalence class In mathematics, when the elements of some set S have a notion of equivalence (formalized as an equivalence relation), then one may naturally split the set S into equivalence classes. These equivalence classes are constructed so that elements a ...
es. Therefore, the Bell numbers also count the equivalence relations.


Factorizations

If a number ''N'' is a squarefree positive integer (meaning that it is the product of some number ''n'' of distinct prime numbers), then ''Bn'' gives the number of different multiplicative partitions of ''N''. These are factorizations of ''N'' into numbers greater than one, treating two factorizations as the same if they have the same factors in a different order. For instance, 30 is the product of the three primes 2, 3, and 5, and has ''B''3 = 5 factorizations: :30 = 2\times 15=3\times 10=5\times 6=2\times 3\times 5


Rhyme schemes

The Bell numbers also count the rhyme schemes of an ''n''-line poem or
stanza In poetry, a stanza (; from Italian language, Italian ''stanza'' , "room") is a group of lines within a poem, usually set off from others by a blank line or Indentation (typesetting), indentation. Stanzas can have regular rhyme scheme, rhyme and ...
. A rhyme scheme describes which lines rhyme with each other, and so may be interpreted as a partition of the set of lines into rhyming subsets. Rhyme schemes are usually written as a sequence of Roman letters, one per line, with rhyming lines given the same letter as each other, and with the first lines in each rhyming set labeled in alphabetical order. Thus, the 15 possible four-line rhyme schemes are AAAA, AAAB, AABA, AABB, AABC, ABAA, ABAB, ABAC, ABBA, ABBB, ABBC, ABCA, ABCB, ABCC, and ABCD.


Permutations

The Bell numbers come up in a card shuffling problem mentioned in the addendum to . If a deck of ''n'' cards is shuffled by repeatedly removing the top card and reinserting it anywhere in the deck (including its original position at the top of the deck), with exactly ''n'' repetitions of this operation, then there are ''n''''n'' different shuffles that can be performed. Of these, the number that return the deck to its original sorted order is exactly ''Bn''. Thus, the probability that the deck is in its original order after shuffling it in this way is ''Bn''/''n''''n'', which is significantly larger than the 1/''n''! probability that would describe a uniformly random permutation of the deck. Related to card shuffling are several other problems of counting special kinds of
permutation In mathematics, a permutation of a set is, loosely speaking, an arrangement of its members into a sequence or linear order, or if the set is already ordered, a rearrangement of its elements. The word "permutation" also refers to the act or proc ...
s that are also answered by the Bell numbers. For instance, the ''n''th Bell number equals the number of permutations on ''n'' items in which no three values that are in sorted order have the last two of these three consecutive. In a notation for generalized permutation patterns where values that must be consecutive are written adjacent to each other, and values that can appear non-consecutively are separated by a dash, these permutations can be described as the permutations that avoid the pattern 1-23. The permutations that avoid the generalized patterns 12-3, 32-1, 3-21, 1-32, 3-12, 21-3, and 23-1 are also counted by the Bell numbers. The permutations in which every 321 pattern (without restriction on consecutive values) can be extended to a 3241 pattern are also counted by the Bell numbers. However, the Bell numbers grow too quickly to count the permutations that avoid a pattern that has not been generalized in this way: by the (now proven)
Stanley–Wilf conjecture The Stanley–Wilf conjecture, formulated independently by Richard P. Stanley and Herbert Wilf in the late 1980s, states that the growth rate of every proper permutation class is singly exponential. It was proved by and is no longer a conjecture. ...
, the number of such permutations is singly exponential, and the Bell numbers have a higher asymptotic growth rate than that.


Triangle scheme for calculations

The Bell numbers can easily be calculated by creating the so-called
Bell triangle In mathematics, the Bell triangle is a triangle of numbers analogous to Pascal's triangle, whose values count partitions of a set in which a given element is the largest singleton. It is named for its close connection to the Bell numbers, which may ...
, also called Aitken's array or the Peirce triangle after
Alexander Aitken Alexander Craig "Alec" Aitken (1 April 1895 – 3 November 1967) was one of New Zealand's most eminent mathematicians. In a 1935 paper he introduced the concept of generalized least squares, along with now standard vector/matrix notation fo ...
and Charles Sanders Peirce. # Start with the number one. Put this on a row by itself. ( x_ = 1 ) # Start a new row with the rightmost element from the previous row as the leftmost number (x_ \leftarrow x_ where ''r'' is the last element of (''i''-1)-th row) # Determine the numbers not on the left column by taking the sum of the number to the left and the number above the number to the left, that is, the number diagonally up and left of the number we are calculating ( x_ \leftarrow x_ + x_ ) # Repeat step three until there is a new row with one more number than the previous row (do step 3 until j = r + 1 ) # The number on the left hand side of a given row is the ''Bell number'' for that row. (B_i \leftarrow x_) Here are the first five rows of the triangle constructed by these rules: 1 1 2 2 3 5 5 7 10 15 15 20 27 37 52 The Bell numbers appear on both the left and right sides of the triangle.


Properties


Summation formulas

The Bell numbers satisfy a recurrence relation involving
binomial coefficient In mathematics, the binomial coefficients are the positive integers that occur as coefficients in the binomial theorem. Commonly, a binomial coefficient is indexed by a pair of integers and is written \tbinom. It is the coefficient of the t ...
s: :B_=\sum_^ \binom B_k. It can be explained by observing that, from an arbitrary partition of ''n'' + 1 items, removing the set containing the first item leaves a partition of a smaller set of ''k'' items for some number ''k'' that may range from 0 to ''n''. There are \tbinom choices for the ''k'' items that remain after one set is removed, and ''Bk'' choices of how to partition them. A different summation formula represents each Bell number as a sum of Stirling numbers of the second kind :B_n=\sum_^n \left\. The Stirling number \left\ is the number of ways to partition a set of cardinality ''n'' into exactly ''k'' nonempty subsets. Thus, in the equation relating the Bell numbers to the Stirling numbers, each partition counted on the left hand side of the equation is counted in exactly one of the terms of the sum on the right hand side, the one for which ''k'' is the number of sets in the partition. has given a formula that combines both of these summations: :B_ = \sum_^n \sum_^m \left\ j^ B_k.


Generating function

The exponential generating function of the Bell numbers is :B(x) = \sum_^\infty \frac x^n = e^. In this formula, the summation in the middle is the general form used to define the exponential generating function for any sequence of numbers, and the formula on the right is the result of performing the summation in the specific case of the Bell numbers. One way to derive this result uses analytic combinatorics, a style of mathematical reasoning in which sets of mathematical objects are described by formulas explaining their construction from simpler objects, and then those formulas are manipulated to derive the combinatorial properties of the objects. In the language of analytic combinatorics, a set partition may be described as a set of nonempty urns into which elements labelled from 1 to ''n'' have been distributed, and the combinatorial class of all partitions (for all ''n'') may be expressed by the notation :\mathrm(\mathrm_(\mathcal)). Here, \mathcal is a combinatorial class with only a single member of size one, an element that can be placed into an urn. The inner \mathrm_ operator describes a set or urn that contains one or more labelled elements, and the outer \mathrm describes the overall partition as a set of these urns. The exponential generating function may then be read off from this notation by translating the \mathrm operator into the exponential function and the nonemptiness constraint ≥1 into subtraction by one. An alternative method for deriving the same generating function uses the recurrence relation for the Bell numbers in terms of binomial coefficients to show that the exponential generating function satisfies the differential equation B'(x) = e^B(x). The function itself can be found by solving this equation.


Moments of probability distributions

The Bell numbers satisfy Dobinski's formula :B_n=\frac\sum_^\infty \frac. This formula can be derived by expanding the exponential generating function using the Taylor series for the exponential function, and then collecting terms with the same exponent. It allows ''Bn'' to be interpreted as the ''n''th
moment Moment or Moments may refer to: * Present time Music * The Moments, American R&B vocal group Albums * ''Moment'' (Dark Tranquillity album), 2020 * ''Moment'' (Speed album), 1998 * ''Moments'' (Darude album) * ''Moments'' (Christine Guldbrand ...
of a Poisson distribution with
expected value In probability theory, the expected value (also called expectation, expectancy, mathematical expectation, mean, average, or first moment) is a generalization of the weighted average. Informally, the expected value is the arithmetic mean of a l ...
1. The ''n''th Bell number is also the sum of the coefficients in the ''n''th complete Bell polynomial, which expresses the ''n''th
moment Moment or Moments may refer to: * Present time Music * The Moments, American R&B vocal group Albums * ''Moment'' (Dark Tranquillity album), 2020 * ''Moment'' (Speed album), 1998 * ''Moments'' (Darude album) * ''Moments'' (Christine Guldbrand ...
of any
probability distribution In probability theory and statistics, a probability distribution is the mathematical function that gives the probabilities of occurrence of different possible outcomes for an experiment. It is a mathematical description of a random phenomenon i ...
as a function of the first ''n'' cumulants.


Modular arithmetic

The Bell numbers obey Touchard's congruence: If ''p'' is any prime number then :B_ \equiv B_n+B_ \pmod p or, generalizing :B_ \equiv mB_n+B_ \pmod p. Because of Touchard's congruence, the Bell numbers are periodic modulo ''p'', for every prime number ''p''; for instance, for ''p'' = 2, the Bell numbers repeat the pattern odd-odd-even with period three. The period of this repetition, for an arbitrary prime number ''p'', must be a divisor of :\frac and for all prime ''p'' ≤ 101 and ''p'' = 113, 163, 167, or 173 it is exactly this number . The period of the Bell numbers to modulo ''n'' are :1, 3, 13, 12, 781, 39, 137257, 24, 39, 2343, 28531167061, 156, 25239592216021, 411771, 10153, 48, 51702516367896047761, 39, 109912203092239643840221, 9372, 1784341, 85593501183, 949112181811268728834319677753, 312, 3905, 75718776648063, 117, 1647084, 91703076898614683377208150526107718802981, 30459, 568972471024107865287021434301977158534824481, 96, 370905171793, 155107549103688143283, 107197717, 156, ...


Integral representation

An application of Cauchy's integral formula to the exponential generating function yields the complex integral representation : B_n = \frac \int_ \frac \, dz. Some asymptotic representations can then be derived by a standard application of the method of steepest descent.


Log-concavity

The Bell numbers form a logarithmically convex sequence. Dividing them by the factorials, ''B''''n''/''n''!, gives a logarithmically concave sequence.


Growth rate

Several
asymptotic In analytic geometry, an asymptote () of a curve is a line such that the distance between the curve and the line approaches zero as one or both of the ''x'' or ''y'' coordinates tends to infinity. In projective geometry and related contexts, ...
formulas for the Bell numbers are known. In the following bounds were established: : B_n < \left( \frac \right)^n for all positive integers n; moreover, if \varepsilon>0 then for all n > n_0(\varepsilon) , : B_n < \left( \frac\right)^n where ~n_0(\varepsilon) = \max\left\~ and ~d(x):= \ln \ln (x+1) - \ln \ln x + \frac\,. The Bell numbers can also be approximated using the Lambert W function, a function with the same growth rate as the logarithm, as :B_n \sim \frac \left( \frac \right)^ \exp\left(\frac - n - 1\right). established the expansion :B_ = \frac \times \frac \times \left( 1 + \frac + \frac + O(e^) \right) uniformly for h = O(\ln(n)) as n \rightarrow \infty, where B and each P_i and Q_i are known expressions in W(n). The asymptotic expression : \begin \frac & = \ln n - \ln \ln n - 1 + \frac + \frac + \frac\left(\frac\right)^2 + O\left(\frac \right) \\ & \qquad \textn\to\infty \end was established by .


Bell primes

raised the question of whether infinitely many Bell numbers are also prime numbers. The first few Bell numbers that are prime are: :2, 5, 877, 27644437, 35742549198872617291353508656626642567, 359334085968622831041960188598043661065388726959079837 corresponding to the indices 2, 3, 7, 13, 42 and 55 . The next Bell prime is ''B''2841, which is approximately 9.30740105 × 106538. , it is the largest known prime Bell number. Ignacio Larrosa Cañestro showed it was a probable prime in 2002. After 17 months of computation with Marcel Martin's ECPP program Primo, Ignacio Larrosa Cañestro proved it to be prime in 2004. He ruled out any other possible primes below ''B''6000, later extended to ''B''30447 by Eric Weisstein. The search was extended to ''B''50000 by Václav Kotěšovec (05/18/2021).


History

The Bell numbers are named after Eric Temple Bell, who wrote about them in 1938, following up a 1934 paper in which he studied the
Bell polynomials In combinatorial mathematics, the Bell polynomials, named in honor of Eric Temple Bell, are used in the study of set partitions. They are related to Stirling and Bell numbers. They also occur in many applications, such as in the Faà di Bruno's fo ...
. Bell did not claim to have discovered these numbers; in his 1938 paper, he wrote that the Bell numbers "have been frequently investigated" and "have been rediscovered many times". Bell cites several earlier publications on these numbers, beginning with which gives Dobiński's formula for the Bell numbers. Bell called these numbers "exponential numbers"; the name "Bell numbers" and the notation ''Bn'' for these numbers was given to them by . The first exhaustive enumeration of set partitions appears to have occurred in medieval Japan, where (inspired by the popularity of the book '' The Tale of Genji'') a parlor game called ''genji-ko'' sprang up, in which guests were given five packets of incense to smell and were asked to guess which ones were the same as each other and which were different. The 52 possible solutions, counted by the Bell number ''B''5, were recorded by 52 different diagrams, which were printed above the chapter headings in some editions of The Tale of Genji. and also mention the connection between Bell numbers and The Tale of Genji, in less detail. In
Srinivasa Ramanujan Srinivasa Ramanujan (; born Srinivasa Ramanujan Aiyangar, ; 22 December 188726 April 1920) was an Indian mathematician. Though he had almost no formal training in pure mathematics, he made substantial contributions to mathematical analysis ...
's second notebook, he investigated both Bell polynomials and Bell numbers. Early references for the
Bell triangle In mathematics, the Bell triangle is a triangle of numbers analogous to Pascal's triangle, whose values count partitions of a set in which a given element is the largest singleton. It is named for its close connection to the Bell numbers, which may ...
, which has the Bell numbers on both of its sides, include and .


See also

* Touchard polynomials * Catalan number


Notes


References

* * *. *. *. * * * * * * * * * * * * Reprinted with an addendum as "The Tinkly Temple Bells", Chapter 2 of ''Fractal Music, Hypercards, and more ... Mathematical Recreations from Scientific American'', W. H. Freeman, 1992, pp. 24–38 * * * * * *. * * * * *


External links

* * * {{DEFAULTSORT:Bell Number Integer sequences