International audienceWe establish conditions to characterize probability measures by their L^p-quantization error functions in both R^d and Hilbert settings. This characterization is two-fold: static (identity of two distributions) and dynamic (convergence for the L^p-Wasserstein distance). We first propose a criterion on the quantization level N, valid for any norm on Rd and any order p based on a geometrical approach involving the Voronoi diagram. Then, we prove that in the L^2-case on a (separable) Hilbert space, the condition on the level N can be reduced to N = 2, which is optimal. More quantization based characterization cases in dimension 1 and a discussion of the completeness of a distance defined by the quantization error function...
We study the approximation of expectations E(f(X)) for Gaussian random elements X with values in a s...
We investigate quantization coefficients for probability measures μ on limit sets, which are generat...
We introduce the quantization number and the essential covering rate. We treat the quantization for ...
We elucidate the asymptotics of the Ls-quantization error induced by a sequence of Lr-optimal n-quan...
The term quantization refers to the process of estimating a given probability by a discrete probabil...
We introduce the quantization number and the essential covering rate. We treat the quantization for ...
International audienceWe propose new weak error bounds and expansion in dimension one for optimal qu...
Due to the rapidly increasing need for methods of data compression, quantization has become a flouri...
The problem of quantization can be thought of as follows: given a probability distribution P and a n...
Quantization is intrinsic to several data acquisition systems. This process is especially important ...
We provide a full picture of the upper quantization dimension in term of the R\'enyi dimension, in t...
Let m be a centered Gaussian measure on a separable Banach space E and N a positive integer. We stud...
International audienceQuantization provides a very natural way to preserve the convex order when app...
We show that the asymptotic behavior of the quantization error allows the definition of dimensions f...
AbstractQuantization consists in studying the Lr-error induced by the approximation of a random vect...
We study the approximation of expectations E(f(X)) for Gaussian random elements X with values in a s...
We investigate quantization coefficients for probability measures μ on limit sets, which are generat...
We introduce the quantization number and the essential covering rate. We treat the quantization for ...
We elucidate the asymptotics of the Ls-quantization error induced by a sequence of Lr-optimal n-quan...
The term quantization refers to the process of estimating a given probability by a discrete probabil...
We introduce the quantization number and the essential covering rate. We treat the quantization for ...
International audienceWe propose new weak error bounds and expansion in dimension one for optimal qu...
Due to the rapidly increasing need for methods of data compression, quantization has become a flouri...
The problem of quantization can be thought of as follows: given a probability distribution P and a n...
Quantization is intrinsic to several data acquisition systems. This process is especially important ...
We provide a full picture of the upper quantization dimension in term of the R\'enyi dimension, in t...
Let m be a centered Gaussian measure on a separable Banach space E and N a positive integer. We stud...
International audienceQuantization provides a very natural way to preserve the convex order when app...
We show that the asymptotic behavior of the quantization error allows the definition of dimensions f...
AbstractQuantization consists in studying the Lr-error induced by the approximation of a random vect...
We study the approximation of expectations E(f(X)) for Gaussian random elements X with values in a s...
We investigate quantization coefficients for probability measures μ on limit sets, which are generat...
We introduce the quantization number and the essential covering rate. We treat the quantization for ...