Reproducing Polynomials with B-Splines

A B-Spline of order ${\displaystyle N}$ is known to be able to reproduce any polynomial up to order ${\displaystyle N}$^[1]:

${\displaystyle \sum _{n\in \mathbb {Z} }c_{m,n}\beta _{N}(t-n)=t^{m}}$

In words, a proper linear combination of shifted versions of a B-Spline can reproduce any polynomial up to order ${\displaystyle N}$. This is needed for different applications, for example, for the Sampling at Finite Rate of Innovation (FRI) framework. In this case any kernel ${\displaystyle \varphi }$ reproducing polynomials (that is, satisfying the Strang-Fix conditions) can be used. However, among all possible kernels, the B-Splines have the smallest possible support.

An important question is how to obtain the coefficients ${\displaystyle c_{m,n}}$ for the reproduction-formula. In this small article, I describe one way.