Boas–Buck polynomials

In mathematics, Boas–Buck polynomials are sequences of polynomials Φ(r)
n
(x) given by generating functions of the form

\displaystyle C(zt^r B(t))=\sum_{n\ge0}\Phi_n^{(r)}(z)t^n.

The case r=1, sometimes called generalized Appell polynomials, was studied by Boas and Buck (1958).

References


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