Multiresolutions and primitives

The basic method of constructing wavelets is by means of a multiresolution approximation of \(\mathbf{L}^{\mathbf{2}}(\mathbf{R})\). In this paper we present a class of multiresolution approximations for which the associated scaling function has a simple cardinal interpolating property. We present t

This paper addresses the problem of the level of abstraction at which knowledgebased system computational primitives must be developed so as to facilitate the knowledge acquisition process. Low-level programming or the use of task-level methodologies as they exist now, respectively prevent rapid lea

Recently we found a family of nearly orthonormal affine Riesz bases of compact support and arbitrary degrees of smoothness, obtained by perturbing the onedimensional Haar mother wavelet using B-splines. The mother wavelets thus obtained are symmetric and given in closed form, features which are gene