In mathematics, a generating function is a formal power series in one indeterminate, whose coefficients encode information about a sequence of numbers an that is indexed by the natural numbers. Generating functions were first introduced by Abraham de Moivre in 1730, in order to solve the general linear recurrence problem. One can generalize to formal power series in more than one indeterminate, to encode information about arrays of numbers indexed by several natural numbers.
There are various types of generating functions, including ordinary generating functions, exponential generating functions, Lambert series, Bell series, and Dirichlet series; definitions and examples are given below. Every sequence in principle has a generating function of each type (except that Lambert and Dirichlet series require indices to start at 1 rather than 0), but the ease with which they can be handled may differ considerably. The particular generating function, if any, that is most useful in a given context will depend upon the nature of the sequence and the details of the problem being addressed.
Generating functions are often expressed in closed form (rather than as a series), by some expression involving operations defined for formal power series. These expressions in terms of the indeterminate x may involve arithmetic operations, differentiation with respect to x and composition with (i.e., substitution into) other generating functions; since these operations are also defined for functions, the result looks like a function of x. Indeed, the closed form expression can often be interpreted as a function that can be evaluated at (sufficiently small) concrete values of x, and which has the formal power series as its Taylor series; this explains the designation "generating functions". However such interpretation is not required to be possible, because formal power series are not required to give a convergent series when a nonzero numeric value is substituted for x. Also, not all expressions that are meaningful as functions of x are meaningful as expressions designating formal power series; negative and fractional powers of x are examples of this.
- 1 Definitions
- 2 Ordinary generating functions
- 3 Examples
- 4 Applications
- 5 Other generating functions
- 6 History
- 7 See also
- 8 Notes
- 9 References
- 10 External links
- A generating function is a device somewhat similar to a bag. Instead of carrying many little objects detachedly, which could be embarrassing, we put them all in a bag, and then we have only one object to carry, the bag.
- —George Polya, Mathematics and plausible reasoning (1954)
- A generating function is a clothesline on which we hang up a sequence of numbers for display.
- —Herbert Wilf, Generatingfunctionology (1994)
Ordinary generating function
The ordinary generating function of a sequence an is
When the term generating function is used without qualification, it is usually taken to mean an ordinary generating function.
The ordinary generating function can be generalized to arrays with multiple indices. For example, the ordinary generating function of a two-dimensional array am, n (where n and m are natural numbers) is
Exponential generating function
The exponential generating function of a sequence an is
Poisson generating function
The Poisson generating function of a sequence an is
The Lambert series of a sequence an is
Note that in a Lambert series the index n starts at 1, not at 0, as the first term would otherwise be undefined.
Dirichlet series generating functions
Polynomial sequence generating functions
The idea of generating functions can be extended to sequences of other objects. Thus, for example, polynomial sequences of binomial type are generated by
where pn(x) is a sequence of polynomials and f(t) is a function of a certain form. Sheffer sequences are generated in a similar way. See the main article generalized Appell polynomials for more information.
Ordinary generating functions
Polynomials are a special case of ordinary generating functions, corresponding to finite sequences, or equivalently sequences that vanish after a certain point. These are important in that many finite sequences can usefully be interpreted as generating functions, such as the Poincaré polynomial and others.
A key generating function is the constant sequence 1, 1, 1, 1, 1, 1, 1, 1, 1, ..., whose ordinary generating function is
The left-hand side is the Maclaurin series expansion of the right-hand side. Alternatively, the right-hand side expression can be justified by multiplying the power series on the left by 1 − x, and checking that the result is the constant power series 1, in other words that all coefficients except the one of x0 vanish. Moreover there can be no other power series with this property. The left-hand side therefore designates the multiplicative inverse of 1 − x in the ring of power series.
Expressions for the ordinary generating function of other sequences are easily derived from this one. For instance, the substitution x → ax gives the generating function for the geometric sequence 1, a, a2, a3, ... for any constant a:
(The equality also follows directly from the fact that the left-hand side is the Maclaurin series expansion of the right-hand side.) In particular,
One can also introduce regular "gaps" in the sequence by replacing x by some power of x, so for instance for the sequence 1, 0, 1, 0, 1, 0, 1, 0, .... one gets the generating function
By squaring the initial generating function, or by finding the derivative of both sides with respect to x and making a change of running variable n → n-1, one sees that the coefficients form the sequence 1, 2, 3, 4, 5, ..., so one has
More generally, for any non-negative integer k and non-zero real value a, it is true that
Note that, since
one can find the ordinary generating function for the sequence 0, 1, 4, 9, 16, ... of square numbers by linear combination of binomial-coefficient generating sequences;
The ordinary generating function of a sequence can be expressed as a rational function (the ratio of two polynomials) if and only if the sequence is a linear recursive sequence with constant coefficients; this generalizes the examples above. Going in the reverse direction, every sequence generated by a fraction of polynomials satisfies a linear recurrence with constant coefficients; these coefficients are identical to the coefficients of the fraction denominator polynomial (so they can be directly read off).
Multiplication yields convolution
of a sequence with ordinary generating function G(an; x) has the generating function
because 1/(1-x) is the ordinary generating function for the sequence (1, 1, ...).
Relation to discrete-time Fourier transform
When the series converges absolutely,
is the discrete-time Fourier transform of the sequence a0, a1, ....
Asymptotic growth of a sequence
In calculus, often the growth rate of the coefficients of a power series can be used to deduce a radius of convergence for the power series. The reverse can also hold; often the radius of convergence for a generating function can be used to deduce the asymptotic growth of the underlying sequence.
For instance, if an ordinary generating function G(an; x) that has a finite radius of convergence of r can be written as
Often this approach can be iterated to generate several terms in an asymptotic series for an. In particular,
The asymptotic growth of the coefficients of this generating function can then be sought via the finding of A, B, α, β, and r to describe the generating function, as above.
Similar asymptotic analysis is possible for exponential generating functions. With an exponential generating function, it is an/n! that grows according to these asymptotic formulae.
Asymptotic growth of the sequence of squares
As derived above, the ordinary generating function for the sequence of squares is
With r = 1, α = 0, β = 3, A(x) = 0, and B(x) = x(x+1), we can verify that the squares grow as expected, like the squares:
Asymptotic growth of the Catalan numbers
The ordinary generating function for the Catalan numbers is
With r = 1/4, α = 1, β = −1/2, A(x) = 1/2, and B(x) = −1/2, we can conclude that, for the Catalan numbers,
Bivariate and multivariate generating functions
One can define generating functions in several variables for arrays with several indices. These are called multivariate generating functions or, sometimes, super generating functions. For two variables, these are often called bivariate generating functions.
For instance, since is the ordinary generating function for binomial coefficients for a fixed n, one may ask for a bivariate generating function that generates the binomial coefficients for all k and n. To do this, consider as itself a series, in n, and find the generating function in y that has these as coefficients. Since the generating function for is
the generating function for the binomial coefficients is:
Generating functions for the sequence of square numbers an = n2 are:
Ordinary generating function
Exponential generating function
Dirichlet series generating function
using the Riemann zeta function.
The sequence an generated by a Dirichlet series generating function corresponding to:
where is the Riemann zeta function, has the ordinary generating function:
Multivariate generating function
Multivariate generating functions arise in practice when calculating the number of contingency tables of non-negative integers with specified row and column totals. Suppose the table has r rows and c columns; the row sums are and the column sums are . Then, according to I. J. Good, the number of such tables is the coefficient of
Techniques of evaluating sums with generating function
Generating functions give us several methods to manipulate sums and to establish identities between sums.
The simplest case occurs when . We then know that for the corresponding ordinary generating functions.
For example, we can manipulate , where are the harmonic numbers. Let be the ordinary generating function of the harmonic numbers. Then
Using , convolution with the numerator yields
which can also be written as
- 1.Consider A(z) and B(z) are ordinary generating functions.
- 2.Consider A(z) and B(z) are exponential generating functions.
But sometimes the sum is complex,it is not easy to find the inner sums of which we want to evaluating. The "Free Parameter" method is another method(called "snake oil" by H. Wilf) for us to evaluate sums.
Both methods discussed so far have n as limit in the summation.When n does not appear explicitly in the summation, we may consider n as a “free” parameter, treat as a coefficient of , change the order of the summations on n and k,and try to compute the inner sum.
For example,we want to compute
We treat n as a "free" parameter,and set
Interchanging summation(“snake oil”) gives
Now the inner sum is .Thus
Then we obtain
Generating functions are used to:
- Find a closed formula for a sequence given in a recurrence relation. For example consider Fibonacci numbers.
- Find recurrence relations for sequences—the form of a generating function may suggest a recurrence formula.
- Find relationships between sequences—if the generating functions of two sequences have a similar form, then the sequences themselves may be related.
- Explore the asymptotic behaviour of sequences.
- Prove identities involving sequences.
- Solve enumeration problems in combinatorics and encoding their solutions. Rook polynomials are an example of an application in combinatorics.
- Evaluate infinite sums.
Other generating functions
Examples of polynomial sequences generated by more complex generating functions include:
- Appell polynomials
- Chebyshev polynomials
- Difference polynomials
- Generalized Appell polynomials
- Q-difference polynomials
Other sequences generated by more complex generating functions:
- Double exponential generating functions. For example: Aitken's Array: Triangle of Numbers
- The name "generating function" is due to Laplace. Yet, without giving it a name, Euler used the device of generating functions long before Laplace [..]. He applied this mathematical tool to several problems in Combinatory Analysis and the Theory of Numbers.
- Moment-generating function
- Probability-generating function
- Stanley's reciprocity theorem
- Applications to partitions[which?]
- Combinatorial principles
- Cyclic sieving
- Donald E. Knuth, The Art of Computer Programming, Volume 1 Fundamental Algorithms (Third Edition) Addison-Wesley. ISBN 0-201-89683-4. Section 1.2.9: "Generating Functions".
- This alternative term can already be found in E.N. Gilbert (1956), "Enumeration of Labeled graphs", Canadian Journal of Mathematics 3, p. 405–411, but its use is rare before the year 2000; since then it appears to be increasing.
- Flajolet & Sedgewick (2009) p.95
- Apostol, Tom M. (1976), Introduction to analytic number theory, Undergraduate Texts in Mathematics, New York-Heidelberg: Springer-Verlag, ISBN 978-0-387-90163-3, MR 0434929, Zbl 0335.10001 pp.42–43
- Wilf (1994) p.56
- Wilf (1994) p.59
- Good, I. J. (1986). "On applications of symmetric Dirichlet distributions and their mixtures to contingency tables". Annals of Statistics 4 (6): 1159–1189. doi:10.1214/aos/1176343649.
- Doubilet, Peter; Rota, Gian-Carlo; Stanley, Richard (1972). "On the foundations of combinatorial theory. VI. The idea of generating function". Proceedings of the Sixth Berkeley Symposium on Mathematical Statistics and Probability 2: 267–318. Zbl 0267.05002. Reprinted in Rota, Gian-Carlo (1975). "3. The idea of generating function". Finite Operator Calculus. With the collaboration of P. Doubilet, C. Greene, D. Kahaner, A. Odlyzko and R. Stanley. Academic Press. pp. 83–134. ISBN 0-12-596650-4. Zbl 0328.05007.
- Flajolet, Philippe; Sedgewick, Robert (2009). Analytic Combinatorics (PDF). Cambridge University Press. ISBN 978-0-521-89806-5. Zbl 1165.05001.
- Goulden, Ian P.; Jackson, David M. (2004). Combinatorial Enumeration. Dover Publications. ISBN 978-0486435978.
- Ronald L. Graham; Donald E. Knuth; Oren Patashnik (1994). "Chapter 7: Generating Functions". Concrete Mathematics. A foundation for computer science (second ed.). Addison-Wesley. pp. 320–380. ISBN 0-201-55802-5. Zbl 0836.00001.
- Wilf, Herbert S. (1994). Generatingfunctionology (2nd ed.). Boston, MA: Academic Press. ISBN 0-12-751956-4. Zbl 0831.05001.
- Martin Aigner. A Course in Enumeration