Abstract. Osmosis filters are based on drift–diffusion processes. They offer nontrivial steady states with a number of interesting applications. In this paper we present a fully discrete theory for linear osmosis filtering that follows the structure of Weickert’s discrete framework for diffusion filters. It regards the positive initial image as a vector and expresses its evolution in terms of iterative matrix–vector multiplications. The matrix differs from its diffusion counterpart by the fact that it is unsymmet-ric. We assume that it satisfies four properties: vanishing column sums, nonnegativity, irreducibility, and positive diagonal elements. Then the resulting filter class preserves the average grey value and the positivity of the solu...
International audienceThis article details a novel numerical scheme to approximate gradient flows fo...
Le problème de filtrage consiste à estimer l'état d'un système dynamique, appelé signal qui est souv...
Herein, we consider direct Markov chain approximations to the Duncan-Mortensen-Zakai equations for n...
Abstract. Recently a new class of generalised diffusion filters called osmosis fil-ters has been pro...
Abstract. Osmosis is a transport phenomenon that is omnipresent in nature. It differs from diffusion...
Partial differential equations can model many physical phenomena and be used to simulate under compu...
ABSTRACT. We point out a simple 2D formula to reconstruct the discrete gradient on a polygon from th...
25 pages, 14 figuresWe consider a non-linear variant of the transport-diffusion osmosis model for so...
AbstractEver since the technique of the Kalman–Bucy filter was popularized, there has been an intens...
Abstract. Forward-and-backward (FAB) diffusion is a method for sharpening blurry images (Gilboa et a...
AbstractThis paper concerns discrete time Galerkin approximations to the solution of the filtering p...
This paper presents a generalization of results on convergence and robustness of discretization sche...
International audienceWe consider the problem of estimating the state of a diffusion process, based ...
We introduce a time-implicite Voronoi box based finite volume discretization for the initial-boundar...
This paper presents a generalization of results on convergence and robustness of discretization sche...
International audienceThis article details a novel numerical scheme to approximate gradient flows fo...
Le problème de filtrage consiste à estimer l'état d'un système dynamique, appelé signal qui est souv...
Herein, we consider direct Markov chain approximations to the Duncan-Mortensen-Zakai equations for n...
Abstract. Recently a new class of generalised diffusion filters called osmosis fil-ters has been pro...
Abstract. Osmosis is a transport phenomenon that is omnipresent in nature. It differs from diffusion...
Partial differential equations can model many physical phenomena and be used to simulate under compu...
ABSTRACT. We point out a simple 2D formula to reconstruct the discrete gradient on a polygon from th...
25 pages, 14 figuresWe consider a non-linear variant of the transport-diffusion osmosis model for so...
AbstractEver since the technique of the Kalman–Bucy filter was popularized, there has been an intens...
Abstract. Forward-and-backward (FAB) diffusion is a method for sharpening blurry images (Gilboa et a...
AbstractThis paper concerns discrete time Galerkin approximations to the solution of the filtering p...
This paper presents a generalization of results on convergence and robustness of discretization sche...
International audienceWe consider the problem of estimating the state of a diffusion process, based ...
We introduce a time-implicite Voronoi box based finite volume discretization for the initial-boundar...
This paper presents a generalization of results on convergence and robustness of discretization sche...
International audienceThis article details a novel numerical scheme to approximate gradient flows fo...
Le problème de filtrage consiste à estimer l'état d'un système dynamique, appelé signal qui est souv...
Herein, we consider direct Markov chain approximations to the Duncan-Mortensen-Zakai equations for n...