Convergence of multivariate non-stationary vector subdivision schemes

In this paper we consider functional equations of the form = α∈Z s a(α) (M•α), where = (φ 1 , . . . , φ r ) T is an r × 1 vector of functions on the s-dimensional Euclidean space, a(α), α ∈ Z s , is a finitely supported sequence of r × r complex matrices, and M is an s ×s isotropic integer matrix su

In this paper we consider a 6-point interpolating C 2 binary non-stationary subdivision scheme and present some of its important properties. We highlight some advantages of the scheme and demonstrate its performance by some examples.

We present a non-stationary subdivision scheme for generating surfaces from meshes of arbitrary topology. Surfaces generated by this scheme are tensor product bi-quadratic trigonometric spline surfaces except at the extraordinary points. The scheme can be considered as a adaptation of the Doo-Sabin

While the continuous Fourier transform is a well-established standard tool for the analysis of subdivision schemes, we present a new technique based on the discrete Fourier transform instead. We first prove a very general convergence criterion for arbitrary interpolatory schemes, i.e., for nonstatio

Subdivision schemes are popular iterative processes to build graphs of functions, curves and surfaces. We analyze the 2-point Hermite C 2 subdivision scheme introduced by Merrien in [26]. For the analysis of its convergence and its smoothness properties we are concerned with the computation of the j