This paper deals with the resolution of inverse problems in a periodic setting or, in other terms, the reconstruction of periodic continuous-domain signals from their noisy measurements. We focus on two reconstruction paradigms: variational and statistical. In the variational approach, the reconstructed signal is solution to an optimization problem that establishes a trade off between fidelity to the data and smoothness conditions via a quadratic regularization associated with a linear operator. In the statistical approach, the signal is modeled as a stationary random process defined from a Gaussian white noise and a whitening operator; one then looks for the optimal estimator in the mean-square sense. We give a generic form of the reconstr...
We focus on the generalized-interpolation problem. There, one reconstructs continuous-domain signals...
The method of regularization with the Gaussian reproducing kernel is popular in the machine learning...
Abstract—Starting from the power spectral density of Matérn stochastic processes, we introduce a new...
We study continuous-domain linear inverse problems with generalized total-variation (gTV) regulariza...
Shannon’s sampling theory and its variants provide effective solutions to the problem of reconstruct...
Abstract—We introduce an extended class of cardinal L L-splines, where L is a pseudo-differential op...
We consider statistical inverse problems with statistical noise. By using regularization methods one...
The variational reconstruction theory from a companion paper finds a solution consistent with some l...
Abstract — We present a novel statistically-based discretization paradigm and derive a class of maxi...
AbstractThis paper introduces a new nonparametric estimator based on penalized regression splines fo...
In image formation, the observed images are usually blurred by optical instruments and/or transfer ...
We present a statistical framework to benchmark the performance of neural-network-based reconstructi...
A method of real-time reconstruction of the useful signal and its lower derivatives on the basis of ...
We present a novel statistically-based discretization paradigm and derive a class of maximum a poste...
In this thesis, we study the problem of recovering signals, in particular images, that approximately...
We focus on the generalized-interpolation problem. There, one reconstructs continuous-domain signals...
The method of regularization with the Gaussian reproducing kernel is popular in the machine learning...
Abstract—Starting from the power spectral density of Matérn stochastic processes, we introduce a new...
We study continuous-domain linear inverse problems with generalized total-variation (gTV) regulariza...
Shannon’s sampling theory and its variants provide effective solutions to the problem of reconstruct...
Abstract—We introduce an extended class of cardinal L L-splines, where L is a pseudo-differential op...
We consider statistical inverse problems with statistical noise. By using regularization methods one...
The variational reconstruction theory from a companion paper finds a solution consistent with some l...
Abstract — We present a novel statistically-based discretization paradigm and derive a class of maxi...
AbstractThis paper introduces a new nonparametric estimator based on penalized regression splines fo...
In image formation, the observed images are usually blurred by optical instruments and/or transfer ...
We present a statistical framework to benchmark the performance of neural-network-based reconstructi...
A method of real-time reconstruction of the useful signal and its lower derivatives on the basis of ...
We present a novel statistically-based discretization paradigm and derive a class of maximum a poste...
In this thesis, we study the problem of recovering signals, in particular images, that approximately...
We focus on the generalized-interpolation problem. There, one reconstructs continuous-domain signals...
The method of regularization with the Gaussian reproducing kernel is popular in the machine learning...
Abstract—Starting from the power spectral density of Matérn stochastic processes, we introduce a new...