Sheffer Sequence - Properties

Properties

The set of all Sheffer sequences is a group under the operation of umbral composition of polynomial sequences, defined as follows. Suppose { p_n(x) : n = 0, 1, 2, 3, ... } and { q_n(x) : n = 0, 1, 2, 3, ... } are polynomial sequences, given by

Then the umbral composition is the polynomial sequence whose nth term is

(the subscript n appears in p_n, since this is the n term of that sequence, but not in q, since this refers to the sequence as a whole rather than one of its terms).

The neutral element of this group is the standard monomial basis

Two important subgroups are the group of Appell sequences, which are those sequences for which the operator Q is mere differentiation, and the group of sequences of binomial type, which are those that satisfy the identity

A Sheffer sequence { p_n(x) : n = 0, 1, 2, . . . } is of binomial type if and only if both

and

The group of Appell sequences is abelian; the group of sequences of binomial type is not. The group of Appell sequences is a normal subgroup; the group of sequences of binomial type is not. The group of Sheffer sequences is a semidirect product of the group of Appell sequences and the group of sequences of binomial type. It follows that each coset of the group of Appell sequences contains exactly one sequence of binomial type. Two Sheffer sequences are in the same such coset if and only if the operator Q described above – called the "delta operator" of that sequence – is the same linear operator in both cases. (Generally, a delta operator is a shift-equivariant linear operator on polynomials that reduces degree by one. The term is due to F. Hildebrandt.)

If s_n(x) is a Sheffer sequence and p_n(x) is the one sequence of binomial type that shares the same delta operator, then

Sometimes the term Sheffer sequence is defined to mean a sequence that bears this relation to some sequence of binomial type. In particular, if { s_n(x) } is an Appell sequence, then

The sequence of Hermite polynomials, the sequence of Bernoulli polynomials, and the monomials { xn : n = 0, 1, 2, ... } are examples of Appell sequences.

A Sheffer sequence p_n is characterised by its exponential generating function

where A and B are (formal) power series in t. Sheffer sequences are thus examples of generalized Appell polynomials and hence have an associated recurrence relation.