AbstractWavelet analysis is nowadays a widely used tool in applied mathematics. The concept of vector-valued binary wavelets with two-scale dilation factor associated with an orthogonal vector-valued scaling function is introduced. The existence of orthogonal vector-valued wavelets with two-scale is discussed. A necessary and sufficient condition is provided by means of vector-valued multiresolution analysis and paraunitary vector filter bank theory. An algorithm for constructing a sort of orthogonal vector-valued wavelets with compact support is proposed, and their orthogonal properties are investigated
Within the last two decades, wavelet analysis has become a very powerful tool in applied mathematics...
AbstractWavelet analysis is nowadays a widely used tool in applied mathematics. In this work the con...
This chapter is a survey of the work that has been done by Donovan, Geronimo, Hardin, and the author...
AbstractWavelet analysis has been developed a new branch for over twenty years. The concept of vecto...
AbstractWavelet analysis is nowadays a widely used tool in applied mathematics. The concept of vecto...
AbstractWavelet analysis has been applied to many aspects in science and technology. The notion of v...
polyphase matrix Abstract. Material science is an interdisciplinary field applying the properties of...
AbstractThe construction of all possible biorthogonal wavelet vectors corresponding to a given biort...
A procedure is given for constructing univariate compactly supported, biorthogonal multiwavelets fro...
An orthogonality condition of convolution type is derived for scaling functions satisfying a twoscal...
. This paper gives an overview of recent achievements of the multiwavelet theory. The construction o...
Let a =(a1,a2,…,am)∈ℂm be an m-dimensional vector. Then, it can be identified with an m×m circulant...
Multiresolution is investigated on the basis of shift-invariant spaces. Given a finitely generated s...
AbstractA procedure is given for constructing univariate compactly supported, biorthogonal multiwave...
AbstractSmooth orthogonal and biorthogonal multiwavelets on the real line with their scaling functio...
Within the last two decades, wavelet analysis has become a very powerful tool in applied mathematics...
AbstractWavelet analysis is nowadays a widely used tool in applied mathematics. In this work the con...
This chapter is a survey of the work that has been done by Donovan, Geronimo, Hardin, and the author...
AbstractWavelet analysis has been developed a new branch for over twenty years. The concept of vecto...
AbstractWavelet analysis is nowadays a widely used tool in applied mathematics. The concept of vecto...
AbstractWavelet analysis has been applied to many aspects in science and technology. The notion of v...
polyphase matrix Abstract. Material science is an interdisciplinary field applying the properties of...
AbstractThe construction of all possible biorthogonal wavelet vectors corresponding to a given biort...
A procedure is given for constructing univariate compactly supported, biorthogonal multiwavelets fro...
An orthogonality condition of convolution type is derived for scaling functions satisfying a twoscal...
. This paper gives an overview of recent achievements of the multiwavelet theory. The construction o...
Let a =(a1,a2,…,am)∈ℂm be an m-dimensional vector. Then, it can be identified with an m×m circulant...
Multiresolution is investigated on the basis of shift-invariant spaces. Given a finitely generated s...
AbstractA procedure is given for constructing univariate compactly supported, biorthogonal multiwave...
AbstractSmooth orthogonal and biorthogonal multiwavelets on the real line with their scaling functio...
Within the last two decades, wavelet analysis has become a very powerful tool in applied mathematics...
AbstractWavelet analysis is nowadays a widely used tool in applied mathematics. In this work the con...
This chapter is a survey of the work that has been done by Donovan, Geronimo, Hardin, and the author...