A Riordan array is an infinite lower triangular matrix, , constructed from two formal power series, of order 0 and of order 1, such that .

A Riordan array is an element of the Riordan group.[1] It was defined by mathematician Louis W. Shapiro and named after John Riordan.[1] The study of Riordan arrays is a field influenced by and contributing to other areas such as combinatorics, group theory, matrix theory, number theory, probability, sequences and series, Lie groups and Lie algebras, orthogonal polynomials, graph theory, networks, unimodal sequences, combinatorial identities, elliptic curves, numerical approximation, asymptotic analysis, and data analysis. Riordan arrays also unify tools such as generating functions, computer algebra systems, formal languages, and path models.[2] Books on the subject, such as The Riordan Array[1] (Shapiro et al., 1991), have been published.

Formal definition

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A formal power series   (where   is the ring of formal power series with complex coefficients) is said to have order   if  . Write   for the set of formal power series of order  . A power series   has a multiplicative inverse (i.e.   is a power series) if and only if it has order 0, i.e. if and only if it lies in  ; it has a composition inverse that is there exists a power series   such that   if and only if it has order 1, i.e. if and only if it lies in  .

As mentioned previously, a Riordan array is usually defined via a pair of power series  . The "array" part in its name stems from the fact that one associates to   the array of complex numbers defined by     (here " " means "coefficient of   in  "). Thus column   of the array consists of the sequence of coefficients of the power series   in particular, column 0 determines and is determined by the power series   Because   is of order 0, it has a multiplicative inverse, and it follows that from the array's column 1 we can recover  as  . Since   has order 1,   is of order   and so is   It follows that the array   is lower triangular and exhibits a geometric progression   on its main diagonal. It also follows that the map sending a pair of power series  to its triangular array is injective.

Example

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An example of a Riordan array is given by the pair of power series

 .

It is not difficult to show that this pair generates the infinite triangular array of binomial coefficients  , also called the Pascal matrix:

 .

Proof: If   is a power series with associated coefficient sequence  , then, by Cauchy multiplication of power series,   So the latter series has the coefficient sequence  , and hence  . Fix any   If  , so that  represents column   of the Pascal array, then  . This argument allows to see by induction on   that   has column   of the Pascal array as coefficient sequence.

Properties

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Below are some often-used facts about Riordan arrays. Note that the matrix multiplication rules applied to infinite lower triangular matrices lead to finite sums only and the product of two infinite lower triangular matrices is infinite lower triangular. The next two theorems were first stated and proved by Shapiro et al.[1] who say they modified work they found in papers by Gian-Carlo Rota and the book of Roman.[3]

Theorem: a. Let   and   be Riordan arrays, viewed as infinite lower triangular matrices. Then the product of these matrices is the array associated to the pair   of formal power series, which itself is a Riordan array.

b. This fact justifies the definition of a multiplication ' ' of Riordan arrays viewed as pairs of power series by

 

Proof: Since   have order 0 it is clear that   has order 0. Similarly   implies   So   is a Riordan array. Define a matrix   as the Riordan array   By definition, its  -th column   is the sequence of coefficients of the power series  . If we multiply this matrix from the right with the sequence   we get as a result a linear combination of columns of   which we can read as a linear combination of power series, namely   Thus, viewing sequence   as codified by the power series   we showed that  Here the   is the symbol for indicating correspondence on the power series level with matrix multiplication. We multiplied a Riordan array   with a single power series. Now let   be another Riordan array viewed as a matrix. One can form the product  . The  -th column of this product is just   multiplied with the  -th column of   Since the latter corresponds to the power series  , it follows by the above that the  -th column of   corresponds to  . As this holds for all column indices   occurring in   we have shown part a. Part b is now clear.  

Theorem: The family of Riordan arrays endowed with the product ' ' defined above forms a group: the Riordan group.[1]

Proof: The associativity of the multiplication ' ' follows from associativity of matrix multiplication. Next note  . So   is a left neutral element. Finally, we claim that   is the left inverse to the power series  . For this check the computation    . As is well known, an associative structure which has a left neutral element and where each element has a left inverse is a group.  

Of course, not all invertible infinite lower triangular arrays are Riordan arrays. Here is a useful characterization for the arrays that are Riordan. The following result is apparently due to Rogers. [4]

Theorem: An infinite lower triangular array   is a Riordan array if and only if there exist a sequence traditionally called the  -sequence,   such that

 

Proof.[5]   Let   be the Riordan array stemming from   Since     Since   has order 1, it follows that   is a Riordan array and by the group property there exists a Riordan array   such that   Computing the left-hand side yields   and so comparison yields   Of course   is a solution to this equation; it is unique because   is composition invertible. So, we can rewrite the equation as  

Now from the matrix multiplication law, the  -entry of the left-hand side of this latter equation is

 

At the other hand the  -entry of the right-hand side of the equation above is

 

so that i results. From   we also get   for all   and since we know that the diagonal elements are nonzero, we have   Note that using equation   one can compute all entries knowing the entries  

  Now assume we know of a triangular array the equations   for some sequence   Let   be the generating function of that sequence and define   from the equation   Check that it is possible to solve the resulting equations for the coefficients of   and since   one gets that   has order 1. Let   be the generating function of the sequence   Then for the pair   we find   This is precisely the same equations we have found in the first part of the proof and going through its reasoning we find equations like in  . Since   (or the sequence of its coefficients) determines the other entries, we find that the array we started with is the array we deduced. So, the array in   is a Riordan array.  

Clearly the  -sequence alone does not deliver all the information about a Riordan array. Besides the  -sequence the  -sequence below has been studied and has been shown to be useful.

Theorem. Let   be an infinite lower triangular array whose diagonal sequence   does not contain zeroes. Then there exists a unique sequence   such that

 

Proof: By triangularity of the array, the equation claimed is equivalent to   For   this equation is   and, as   it allows computing   uniquely. In general, if   are known, then   allows computing   uniquely.  

References

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  1. ^ a b c d e Shapiro, Louis W.; Getu, Seyoum; Woan, Wen-Jin; Woodson, Leon C. (November 1991). "The Riordan group". Discrete Applied Mathematics. 34 (1?3): 229?239. doi:10.1016/0166-218X(91)90088-E.
  2. ^ "6th International Conference on Riordan Arrays and Related Topics". 6th International Conference on Riordan Arrays and Related Topics.
  3. ^ Roman, S. (1984). The Umbral Calculus. New York: Academic Press.
  4. ^ Rogers, D. G. (1978). "Pascal triangles, Catalan numbers, and renewal arrays". Discrete Math. 22 (3): 301–310. doi:10.1016/0012-365X(78)90063-8.
  5. ^ He, T.X.; Sprugnoli, R. (2009). "Sequence characterization of Riordan Arrays". Discrete Mathematics. 309 (12): 3962–3974. doi:10.1016/j.disc.2008.11.021.