Abstract—The dyadic wavelet transform is an effective tool for processing piecewise smooth signals; however, its poor frequency resolution (its low Q-factor) limits its effectiveness for processing oscillatory signals like speech, EEG, and vibration measurements, etc. This paper develops a more flexible family of wavelet transforms for which the frequency resolution can be varied. The new wavelet transform can attain higher Q-factors (desirable for processing oscillatory signals) or the same low Q-factor of the dyadic wavelet transform. The new wavelet transform is modestly overcomplete and based on rational dilations. Like the dyadic wavelet transform, it is an easily invertible ‘constant-Q ’ discrete transform implemented using iterated f...
Discrete Wavelet Transform is a wavelet (DWT) transform that is widely used in numerical and functio...
In this paper we consider an extension of the wavelet transform leading to the construction of wavel...
Wavelet transform is a term from signal analysis. It is mostly used in physics, but also in finance,...
Abstract—We develop a rational-dilation wavelet transform for which the dilation factor, the Q-facto...
We propose a wavelet transform which offers a tunable Q-factor in each decomposition level and retai...
This paper develops an overcomplete discrete wavelet transform (DWT) based on rational dilation fact...
This paper presents a fast and effective method for the selection of the least number of scales abl...
Most wavelet transforms used in practice are based on integer sampling factors. Wavelet transforms b...
In this paper we show that the dyadic wavelet transform may be generalized to include non-octave spa...
Time-frequency analysis has long been a very useful tool in the field of signal processing, especial...
Abstract. In many applications such as parameter identification of oscillating systems in civil engi...
Includes bibliographical references (leaf [81])Wavelet theory has been well developed over decades, ...
An approach for designing a critically sampled FIR rational rate filter bank satisfying conditions s...
We consider biorthogonal Coifman wavelet systems, a family of biorthogonal wavelet systems with the ...
. Construction of higher multiplicity wavelets adapted to a particular task is discussed. The propos...
Discrete Wavelet Transform is a wavelet (DWT) transform that is widely used in numerical and functio...
In this paper we consider an extension of the wavelet transform leading to the construction of wavel...
Wavelet transform is a term from signal analysis. It is mostly used in physics, but also in finance,...
Abstract—We develop a rational-dilation wavelet transform for which the dilation factor, the Q-facto...
We propose a wavelet transform which offers a tunable Q-factor in each decomposition level and retai...
This paper develops an overcomplete discrete wavelet transform (DWT) based on rational dilation fact...
This paper presents a fast and effective method for the selection of the least number of scales abl...
Most wavelet transforms used in practice are based on integer sampling factors. Wavelet transforms b...
In this paper we show that the dyadic wavelet transform may be generalized to include non-octave spa...
Time-frequency analysis has long been a very useful tool in the field of signal processing, especial...
Abstract. In many applications such as parameter identification of oscillating systems in civil engi...
Includes bibliographical references (leaf [81])Wavelet theory has been well developed over decades, ...
An approach for designing a critically sampled FIR rational rate filter bank satisfying conditions s...
We consider biorthogonal Coifman wavelet systems, a family of biorthogonal wavelet systems with the ...
. Construction of higher multiplicity wavelets adapted to a particular task is discussed. The propos...
Discrete Wavelet Transform is a wavelet (DWT) transform that is widely used in numerical and functio...
In this paper we consider an extension of the wavelet transform leading to the construction of wavel...
Wavelet transform is a term from signal analysis. It is mostly used in physics, but also in finance,...