Add to ORKGOur modest goal in this paper is to define a generalization of the Fourier transform of L^1(R) and to prove the L^1(R) norm inversion theorem for such a transform (Theorem 1.5). Wiener's notion of deterministic autocorrelation (from the late 1920s) arises naturally in the proof of this result; and Gabor's representation of signals (from 1946), which is a fundamental example of wavelet decomposition, provides the setting
Gabor’s expansion of a signal into a set of shifted and mod-ulated versions of an elementary signal ...
We consider a continuous version of Gabor multipliers: operators consisting of a short-time Fourier ...
Abstract Shape-invariant signals under Fourier transform are investigated leading to a class of eig...
Gabor and wavelet transforms play an important role in signal and harmonic analysis. They are effec...
Gabor and wavelet transforms play an important role in signal and harmonic analysis. They are effec...
ABSTRACT. Harmonic analysis has been the longest lasting and most powerful tool for dealing with sig...
Firstly proposed by Dennis Gabor in 1946 [1], the canonical coherent states of the Gabor filters are...
Gabor's expansion of a signal into a set of shifted and modulated versions of an elementary signal i...
This paper presents a historical development of wavelet transforms, Gabor transforms and their myria...
Gabor's expansion of a signal into a set of shifted and modulated versions of an elementary signal i...
AbstractShape-invariant signals under Fourier transform are investigated leading to a class of eigen...
This invited paper - of a tutorial and review character - presents an overview of two classes of tim...
This invited paper - of a tutorial and review character - presents an overview of two classes of tim...
Abstract. We present an analysis of the representation of images as the magnitudes of their transfor...
This invited paper - of a tutorial and review character - presents an overview of two classes of tim...
Gabor’s expansion of a signal into a set of shifted and mod-ulated versions of an elementary signal ...
We consider a continuous version of Gabor multipliers: operators consisting of a short-time Fourier ...
Abstract Shape-invariant signals under Fourier transform are investigated leading to a class of eig...
Gabor and wavelet transforms play an important role in signal and harmonic analysis. They are effec...
Gabor and wavelet transforms play an important role in signal and harmonic analysis. They are effec...
ABSTRACT. Harmonic analysis has been the longest lasting and most powerful tool for dealing with sig...
Firstly proposed by Dennis Gabor in 1946 [1], the canonical coherent states of the Gabor filters are...
Gabor's expansion of a signal into a set of shifted and modulated versions of an elementary signal i...
This paper presents a historical development of wavelet transforms, Gabor transforms and their myria...
Gabor's expansion of a signal into a set of shifted and modulated versions of an elementary signal i...
AbstractShape-invariant signals under Fourier transform are investigated leading to a class of eigen...
This invited paper - of a tutorial and review character - presents an overview of two classes of tim...
This invited paper - of a tutorial and review character - presents an overview of two classes of tim...
Abstract. We present an analysis of the representation of images as the magnitudes of their transfor...
This invited paper - of a tutorial and review character - presents an overview of two classes of tim...
Gabor’s expansion of a signal into a set of shifted and mod-ulated versions of an elementary signal ...
We consider a continuous version of Gabor multipliers: operators consisting of a short-time Fourier ...
Abstract Shape-invariant signals under Fourier transform are investigated leading to a class of eig...