We introduce a general distributional framework that results in a unifying description and characterization of a rich variety of continuous-time stochastic processes. The cornerstone of our approach is an innovation model that is driven by some generalized white noise process, which may be Gaussian or not (e.g., Laplace, impulsive Poisson, or alpha stable). This allows for a conceptual decoupling between the correlation properties of the process, which are imposed by the whitening operator L, and its sparsity pattern, which is determined by the type of noise excitation. The latter is fully specified by a Levy measure. We show that the range of admissible innovation behavior varies between the purely Gaussian and super-sparse extremes. We pr...
Abstract — It is known that the Karhunen-Loève transform (KLT) of Gaussian first-order auto-regress...
Sinusoidal transforms such as the DCT are known to be optimal-that is, asymptotically equivalent to ...
Stochastic Analysis for Gaussian Random Processes and Fields: With Applications presents Hilbert spa...
We introduce a general distributional framework that results in a unifying description and character...
Abstract — We introduce a general distributional framework that results in a unifying description an...
This paper is devoted to the characterization of an extended family of continuous-time autoregressiv...
The theory of sparse stochastic processes offers a broad class of statistical models to study signal...
Abstract. The characteristic functional is the infinite-dimensional generalization of the Fourier tr...
Motivated by the analog nature of real-world signals, we investigate continuous-time random processe...
We introduce a domain-theoretic framework for continuous-time, continuous-state stochastic processes...
It is possible to construct Levy white noises as generalized random processes in the sense of Gel'fa...
International audienceDiscretization of continuous time autoregressive (AR) processes driven by a Br...
Real-world data such as multimedia, biomedical, and telecommunication signals are formed of specific...
Sinusoidal transforms such as the DCT are known to be optimal—that is, asymptotically equivalent to ...
We study the statistics of wavelet coefficients of non-Gaussian images, focusing mainly on the behav...
Abstract — It is known that the Karhunen-Loève transform (KLT) of Gaussian first-order auto-regress...
Sinusoidal transforms such as the DCT are known to be optimal-that is, asymptotically equivalent to ...
Stochastic Analysis for Gaussian Random Processes and Fields: With Applications presents Hilbert spa...
We introduce a general distributional framework that results in a unifying description and character...
Abstract — We introduce a general distributional framework that results in a unifying description an...
This paper is devoted to the characterization of an extended family of continuous-time autoregressiv...
The theory of sparse stochastic processes offers a broad class of statistical models to study signal...
Abstract. The characteristic functional is the infinite-dimensional generalization of the Fourier tr...
Motivated by the analog nature of real-world signals, we investigate continuous-time random processe...
We introduce a domain-theoretic framework for continuous-time, continuous-state stochastic processes...
It is possible to construct Levy white noises as generalized random processes in the sense of Gel'fa...
International audienceDiscretization of continuous time autoregressive (AR) processes driven by a Br...
Real-world data such as multimedia, biomedical, and telecommunication signals are formed of specific...
Sinusoidal transforms such as the DCT are known to be optimal—that is, asymptotically equivalent to ...
We study the statistics of wavelet coefficients of non-Gaussian images, focusing mainly on the behav...
Abstract — It is known that the Karhunen-Loève transform (KLT) of Gaussian first-order auto-regress...
Sinusoidal transforms such as the DCT are known to be optimal-that is, asymptotically equivalent to ...
Stochastic Analysis for Gaussian Random Processes and Fields: With Applications presents Hilbert spa...