AbstractWe introduce a new class of compactly supported orthonormal wavelets which are more regular than the Daubechies wavelets
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1997.Includes bibliogr...
AbstractOur goal is to present a systematic algorithm for constructing (anti)symmetric tight wavelet...
AbstractIn this paper we investigate compactly supported wavelet bases for Sobolev spaces. Starting ...
AbstractWe first show that by combining monodimensional filter banks one can obtain nonseparable fil...
AbstractWe present a construction of regular compactly supported wavelets in any Sobolev space of in...
AbstractIn this paper, we consider the asymptotic regularity of Daubechies scaling functions and con...
AbstractIn this paper, we provide a family of compactly supported orthonormal complex wavelets with ...
AbstractConditions characterizing all orthonormal wavelets of L2(R) are given in terms of suitable o...
AbstractIn this paper, we study a method for the construction of orthonormal wavelet bases with dila...
AbstractWe introduce a new class of compactly supported orthonormal wavelets which are more regular ...
AbstractIn Riemenschneider and Shen (in “Approximation Theory and Functional Analysis” (C. K. Chui, ...
AbstractRecently we found a family of nearly orthonormal affine Riesz bases of compact support and a...
peer reviewedWe show explicitely how to construct scaling functions and wavelets using quintic defic...
AbstractIt is well known that in applied and computational mathematics, cardinal B-splines play an i...
We present a construction of biorthogonal wavelets using a compact operator which allows to preserve...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1997.Includes bibliogr...
AbstractOur goal is to present a systematic algorithm for constructing (anti)symmetric tight wavelet...
AbstractIn this paper we investigate compactly supported wavelet bases for Sobolev spaces. Starting ...
AbstractWe first show that by combining monodimensional filter banks one can obtain nonseparable fil...
AbstractWe present a construction of regular compactly supported wavelets in any Sobolev space of in...
AbstractIn this paper, we consider the asymptotic regularity of Daubechies scaling functions and con...
AbstractIn this paper, we provide a family of compactly supported orthonormal complex wavelets with ...
AbstractConditions characterizing all orthonormal wavelets of L2(R) are given in terms of suitable o...
AbstractIn this paper, we study a method for the construction of orthonormal wavelet bases with dila...
AbstractWe introduce a new class of compactly supported orthonormal wavelets which are more regular ...
AbstractIn Riemenschneider and Shen (in “Approximation Theory and Functional Analysis” (C. K. Chui, ...
AbstractRecently we found a family of nearly orthonormal affine Riesz bases of compact support and a...
peer reviewedWe show explicitely how to construct scaling functions and wavelets using quintic defic...
AbstractIt is well known that in applied and computational mathematics, cardinal B-splines play an i...
We present a construction of biorthogonal wavelets using a compact operator which allows to preserve...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1997.Includes bibliogr...
AbstractOur goal is to present a systematic algorithm for constructing (anti)symmetric tight wavelet...
AbstractIn this paper we investigate compactly supported wavelet bases for Sobolev spaces. Starting ...