Optimal quantization has been recently revisited in multi-dimensional numerical integration (see [18]), multi-asset American option pricing (see [1]), Control Theory (see [19]) and Nonlinear Filtering Theory (see [20]). In this paper, we enlighten some numerical procedures in order to get some accurate optimal quadratic quantization of the Gaussian distribution in higher dimension. We study in particular Newton method in the deterministic case (dimension d = 1) and stochastic gradient in higher dimensional case (d 2). Some heuristics are provided which concern the step in the stochastic gradient method. Finally numerical examples borrowed to mathematical finance are used to test the accuracy of our Gaussian optimal quantizers
THIS THESIS IS DOVOTED TO OPTIMAL QUANTIZATION WITH SOME APPLICATIONS TO MATHEMATICAL FINANCE. CHAP....
We present the first q-Gaussian smoothed functional (SF) estimator of the Hessian and the first Newt...
16 pagesIn this paper we tackle the asymptotics of the critical dimension for quadratic functional q...
This thesis is concerned with the study of optimal quantization and its applications. We deal with t...
International audienceWe propose a new method based on evolutionary optimization for obtaining an op...
We investigate in this paper the numerical performances of quadratic functional quantization and the...
International audienceWe propose a constructive proof for the sharp rate of optimal quadratic functi...
We develop a grid based numerical approach to solve a filtering problem, using results on optimal qu...
We take advantage of recent (see~\cite{GraLusPag1, PagWil}) and new results on optimal quantization...
In this article, we propose several quantization-based stratified sampling methods to reduce the var...
International audienceWe propose new weak error bounds and expansion in dimension one for optimal qu...
We present an introductory survey to optimal vector quantization and its first application...
Cette thèse a pour objectif principal l'étude de résultats asymptotiques autour de la quantification...
We present an introductory survey to optimal vector quantization and its first application...
We present some recent developments on optimal quantization methods for numer-ically feasible soluti...
THIS THESIS IS DOVOTED TO OPTIMAL QUANTIZATION WITH SOME APPLICATIONS TO MATHEMATICAL FINANCE. CHAP....
We present the first q-Gaussian smoothed functional (SF) estimator of the Hessian and the first Newt...
16 pagesIn this paper we tackle the asymptotics of the critical dimension for quadratic functional q...
This thesis is concerned with the study of optimal quantization and its applications. We deal with t...
International audienceWe propose a new method based on evolutionary optimization for obtaining an op...
We investigate in this paper the numerical performances of quadratic functional quantization and the...
International audienceWe propose a constructive proof for the sharp rate of optimal quadratic functi...
We develop a grid based numerical approach to solve a filtering problem, using results on optimal qu...
We take advantage of recent (see~\cite{GraLusPag1, PagWil}) and new results on optimal quantization...
In this article, we propose several quantization-based stratified sampling methods to reduce the var...
International audienceWe propose new weak error bounds and expansion in dimension one for optimal qu...
We present an introductory survey to optimal vector quantization and its first application...
Cette thèse a pour objectif principal l'étude de résultats asymptotiques autour de la quantification...
We present an introductory survey to optimal vector quantization and its first application...
We present some recent developments on optimal quantization methods for numer-ically feasible soluti...
THIS THESIS IS DOVOTED TO OPTIMAL QUANTIZATION WITH SOME APPLICATIONS TO MATHEMATICAL FINANCE. CHAP....
We present the first q-Gaussian smoothed functional (SF) estimator of the Hessian and the first Newt...
16 pagesIn this paper we tackle the asymptotics of the critical dimension for quadratic functional q...