We present a new approach to the construction of orthonormal wavelets on the interval which allows to overcome the ``non interacting boundaries\u27\u27 restriction of existing constructions, and therefore to construct wavelets for ]0,1[ also at large scales in such a way that, in the range of validity of the existing constructions, the two approaches give the same result
AbstractConditions characterizing all orthonormal wavelets of L2(R) are given in terms of suitable o...
Within the last two decades, wavelet analysis has become a very powerful tool in applied mathematics...
Conditions characterizing all orthonormal wavelets of L2(R) are given in terms of suitable orthonorm...
AbstractWe discuss several constructions of orthonormal wavelet bases on the interval, and we introd...
ABSTRACT. An orthonormal wavelet system in Rd, d ∈ N, is a countable collection of functions {ψ j,k ...
AbstractIn this paper, we describe the connection of orthonormal wavelets to interpolatory subdivisi...
By means of simple computations, we construct new classes of non separable QMF's. Some of these QMF'...
AbstractWe introduce a new class of compactly supported orthonormal wavelets which are more regular ...
We present a scheme that will lever orthonormal or biorthogonal wavelets to a new system of biorthog...
We adapt ideas presented by Auscher to impose boundary conditions on the construction of multiresolu...
The paper presents the proof of the fact that the discrete Calderón condition cha-racterizes the co...
We first show that by combining monodimensional filter banks one can obtain nonseparable filter bank...
We give a partial positive answer to a problem posed by Coifman et al. in [1]. Indeed, starting from...
A pair of quadrature mirror filters provides a decomposition of any Hilbert space $H$ as direct sum...
AbstractIn this paper, we study a method for the construction of orthonormal wavelet bases with dila...
AbstractConditions characterizing all orthonormal wavelets of L2(R) are given in terms of suitable o...
Within the last two decades, wavelet analysis has become a very powerful tool in applied mathematics...
Conditions characterizing all orthonormal wavelets of L2(R) are given in terms of suitable orthonorm...
AbstractWe discuss several constructions of orthonormal wavelet bases on the interval, and we introd...
ABSTRACT. An orthonormal wavelet system in Rd, d ∈ N, is a countable collection of functions {ψ j,k ...
AbstractIn this paper, we describe the connection of orthonormal wavelets to interpolatory subdivisi...
By means of simple computations, we construct new classes of non separable QMF's. Some of these QMF'...
AbstractWe introduce a new class of compactly supported orthonormal wavelets which are more regular ...
We present a scheme that will lever orthonormal or biorthogonal wavelets to a new system of biorthog...
We adapt ideas presented by Auscher to impose boundary conditions on the construction of multiresolu...
The paper presents the proof of the fact that the discrete Calderón condition cha-racterizes the co...
We first show that by combining monodimensional filter banks one can obtain nonseparable filter bank...
We give a partial positive answer to a problem posed by Coifman et al. in [1]. Indeed, starting from...
A pair of quadrature mirror filters provides a decomposition of any Hilbert space $H$ as direct sum...
AbstractIn this paper, we study a method for the construction of orthonormal wavelet bases with dila...
AbstractConditions characterizing all orthonormal wavelets of L2(R) are given in terms of suitable o...
Within the last two decades, wavelet analysis has become a very powerful tool in applied mathematics...
Conditions characterizing all orthonormal wavelets of L2(R) are given in terms of suitable orthonorm...