In designing the Hilbert transform pairs of biorthogonal wavelet bases, it has been shown that the requirements of the equal-magnitude responses and the half-sample phase offset on the lowpass filters are the necessary and sufficient condition. In this paper, the relationship between the phase offset and the vanishing moment difference of biorthogonal scaling filters is derived, which implies a simple way to choose the vanishing moments so that the phase response requirement can be satisfied structurally. The magnitude response requirement is approximately achieved by a constrained optimization procedure, where the objective function and constraints are all expressed in terms of the auxiliary filters of scaling filters rather than the scal...
In this thesis, one- as well as multi-dimensional biorthogonal wavelet filters are designed and used...
In the applications of wavelet, it is the most difficult and cumbrous to select the suitable wavelet...
The design and analysis of one-dimensional(1D) nearly-orthogonal symmetric wavelet filter banks has ...
This paper describes a simple procedure, based on spectral factor-ization, for the design of a pair ...
Abstract—It is understood that the Hilbert transform pairs of orthonormal wavelet bases can only be ...
This paper proposes a new class of Hilbert transform pairs of orthonormal symmetric wavelet bases. T...
Abstract: We propose a novel framework for a new class of two-channel biorthogonal filter banks. The...
The accurate and efficient representation of a signal in terms of elementary atoms has been a challe...
This paper proposes a new method of estimating both biorthogonal compactly supported as well as semi...
Hilbert transform pairs of wavelet bases have been pro-posed and proven to be successful in many sig...
We present a scheme that will lever orthonormal or biorthogonal wavelets to a new system of biorthog...
This thesis addresses the problem of constructing a discrete wavelet approximating the shape of a gi...
AbstractSeveral families of biorthogonal wavelet bases are constructed with various properties. In p...
Orthonormal bases of compactly supported wavelet bases correspond to subband coding schemes with exa...
We present here a simple technique for parametrization of popular biorthogonal wavelet filter banks ...
In this thesis, one- as well as multi-dimensional biorthogonal wavelet filters are designed and used...
In the applications of wavelet, it is the most difficult and cumbrous to select the suitable wavelet...
The design and analysis of one-dimensional(1D) nearly-orthogonal symmetric wavelet filter banks has ...
This paper describes a simple procedure, based on spectral factor-ization, for the design of a pair ...
Abstract—It is understood that the Hilbert transform pairs of orthonormal wavelet bases can only be ...
This paper proposes a new class of Hilbert transform pairs of orthonormal symmetric wavelet bases. T...
Abstract: We propose a novel framework for a new class of two-channel biorthogonal filter banks. The...
The accurate and efficient representation of a signal in terms of elementary atoms has been a challe...
This paper proposes a new method of estimating both biorthogonal compactly supported as well as semi...
Hilbert transform pairs of wavelet bases have been pro-posed and proven to be successful in many sig...
We present a scheme that will lever orthonormal or biorthogonal wavelets to a new system of biorthog...
This thesis addresses the problem of constructing a discrete wavelet approximating the shape of a gi...
AbstractSeveral families of biorthogonal wavelet bases are constructed with various properties. In p...
Orthonormal bases of compactly supported wavelet bases correspond to subband coding schemes with exa...
We present here a simple technique for parametrization of popular biorthogonal wavelet filter banks ...
In this thesis, one- as well as multi-dimensional biorthogonal wavelet filters are designed and used...
In the applications of wavelet, it is the most difficult and cumbrous to select the suitable wavelet...
The design and analysis of one-dimensional(1D) nearly-orthogonal symmetric wavelet filter banks has ...