Stirling numbers and Gregory coefficients for the factorization of Hermite subdivision operators

Abstract

In this paper we present a factorization framework for Hermite subdivision schemes refining function values and first derivatives, which satisfy a spectral condition of high order. In particular we show that spectral order d allows for d factorizations of the subdivision operator with respect to the Gregory operators: A new sequence of operators we define using Stirling numbers and Gregory coefficients. We further prove that the d-th factorization provides a ``convergence from contractivity'' method for showing Cd-convergence of the associated Hermite subdivision scheme. The power of our factorization framework lies in the reduction of computational effort for large d: In order to prove Cd-convergence, up to now, d factorization steps were needed, while our method requires only one step, independently of d. Furthermore, in this paper, we show by an example that the spectral condition is not equivalent to the reproduction of polynomials.