Noun
Boas-Buck polynomial (plural Boas-Buck polynomials)
(mathematics) Any member of the sequence of polynomials Φn(x) given by generating functions of the form
C
(
z
t
r
B
(
t
)
)
=
∑
n
≥
0
Φ
n
(
r
)
(
z
)
t
n
{\displaystyle \displaystyle C(zt^{r}B(t))=\sum _{n\geq 0}\Phi _{n}^{(r)}(z)t^{n}}
.