We consider multichannel deconvolution in a periodic setting with long-memory errors under three different scenarios for the convolution operators, i.e., super-smooth, regular-smooth and box-car convolutions. We investigate global performances of linear and hard-thresholded non-linear wavelet estimators for functions over a wide range of Besov spaces and for a variety of loss functions defining the risk. In particular, we obtain upper bounds on convergence rates using the Lp-risk (1 ≤ p < ∞). Contrary to the case where the errors follow independent Brownian motions, it is demonstrated that multichannel deconvolution with errors that follow independent fractional Brownian motions with different Hurst parameters results in a much more invo...
Thresholding algorithms in an orthonormal basis are studied to estimate noisy discrete signals degra...
We consider the problem of denoising a function observed after a convolution with a random filter in...
Deconvolution problems are naturally represented in the Fourier domain, whereas thresholding in wave...
We consider the problem of estimating the unknown response function in the multichannel deconvolutio...
We consider the problem of estimating the unknown response function in the multichannel deconvolutio...
In this paper, a hard thresholding wavelet estimator is constructed for a deconvolution model in a p...
We consider the statistical deconvolution problem where one observes n replications from the model Y...
The paper proposes a method of deconvolution in a periodic setting which combines two important idea...
The paper proposes a method of deconvolution in a periodic setting which combines two important idea...
We extend deconvolution in a periodic setting to deal with functional data. The resulting functional...
In the present dissertation, we investigate two different nonparametric models; empirical Bayes mode...
In this article we study function estimation via wavelet shrinkage for data with long-range dependen...
Abstract: We investigate the asymptotic minimax properties of an adaptive wavelet block thresholding...
Abstract: We investigate global performances of non-linear wavelet estimation in regression models w...
This paper studies the estimation of a density in the convolution density model from weakly dependen...
Thresholding algorithms in an orthonormal basis are studied to estimate noisy discrete signals degra...
We consider the problem of denoising a function observed after a convolution with a random filter in...
Deconvolution problems are naturally represented in the Fourier domain, whereas thresholding in wave...
We consider the problem of estimating the unknown response function in the multichannel deconvolutio...
We consider the problem of estimating the unknown response function in the multichannel deconvolutio...
In this paper, a hard thresholding wavelet estimator is constructed for a deconvolution model in a p...
We consider the statistical deconvolution problem where one observes n replications from the model Y...
The paper proposes a method of deconvolution in a periodic setting which combines two important idea...
The paper proposes a method of deconvolution in a periodic setting which combines two important idea...
We extend deconvolution in a periodic setting to deal with functional data. The resulting functional...
In the present dissertation, we investigate two different nonparametric models; empirical Bayes mode...
In this article we study function estimation via wavelet shrinkage for data with long-range dependen...
Abstract: We investigate the asymptotic minimax properties of an adaptive wavelet block thresholding...
Abstract: We investigate global performances of non-linear wavelet estimation in regression models w...
This paper studies the estimation of a density in the convolution density model from weakly dependen...
Thresholding algorithms in an orthonormal basis are studied to estimate noisy discrete signals degra...
We consider the problem of denoising a function observed after a convolution with a random filter in...
Deconvolution problems are naturally represented in the Fourier domain, whereas thresholding in wave...