Abstract — This paper proposes a systematic procedure for approximating arbitrary probability density functions by means of Dirac mixtures. For that purpose, a distance measure is required, which is in general not well defined for Dirac mixture densities. Hence, a distance measure comparing the corresponding cumulative distribution functions is employed. Here, we focus on the weighted Cramér–von Mises distance, a weighted integral quadratic distance measure, which is simple and intuitive. Since a closed–form solution of the given optimization problem is not possible in general, an efficient solution procedure based on a homotopy continuation approach is proposed. Compared to a standard particle approximation, the proposed procedure ensures ...
In this paper, we present a direct fusion algorithm for processing the combination of two Dirac mixt...
This paper is concerned with distances for comparing multivariate random vectors with a special focu...
Mixture distributions arise in many parametric and non-parametric settings—for example, in Gaussian ...
This paper proposes a systematic procedure for approximating arbitrary probability density functions...
Abstract — A deterministic procedure for optimal approximation of arbitrary probability density func...
Abstract — Greedy procedures for suboptimal Dirac mixture approximation of an arbitrary probability ...
In this paper, we present a novel approach to parametric density estimation from given samples. The ...
Mixed effect modeling is widely used to study cell-to-cell and patient-to-patient variability. The p...
For the optimal approximation of multivariate Gaussian densities by means of Dirac mixtures, i.e., b...
The sample-based recursive prediction of discrete-time nonlinear stochastic dynamic systems requires...
Since the advent of Monte-Carlo particle filtering, particle representations of densities have becom...
This paper introduces a new approach to the recursive propagation of probability density functions t...
Explicit expressions and computational approaches are given for the Fortet-Mourier distance between ...
This paper presents a filter approach for estimating the state of nonlinear dynamic systems based on...
Mixtures of distributions frequently appear in the theory and applications of proba-bility and stati...
In this paper, we present a direct fusion algorithm for processing the combination of two Dirac mixt...
This paper is concerned with distances for comparing multivariate random vectors with a special focu...
Mixture distributions arise in many parametric and non-parametric settings—for example, in Gaussian ...
This paper proposes a systematic procedure for approximating arbitrary probability density functions...
Abstract — A deterministic procedure for optimal approximation of arbitrary probability density func...
Abstract — Greedy procedures for suboptimal Dirac mixture approximation of an arbitrary probability ...
In this paper, we present a novel approach to parametric density estimation from given samples. The ...
Mixed effect modeling is widely used to study cell-to-cell and patient-to-patient variability. The p...
For the optimal approximation of multivariate Gaussian densities by means of Dirac mixtures, i.e., b...
The sample-based recursive prediction of discrete-time nonlinear stochastic dynamic systems requires...
Since the advent of Monte-Carlo particle filtering, particle representations of densities have becom...
This paper introduces a new approach to the recursive propagation of probability density functions t...
Explicit expressions and computational approaches are given for the Fortet-Mourier distance between ...
This paper presents a filter approach for estimating the state of nonlinear dynamic systems based on...
Mixtures of distributions frequently appear in the theory and applications of proba-bility and stati...
In this paper, we present a direct fusion algorithm for processing the combination of two Dirac mixt...
This paper is concerned with distances for comparing multivariate random vectors with a special focu...
Mixture distributions arise in many parametric and non-parametric settings—for example, in Gaussian ...