The approximation of probability measures on compact metric spaces and in particular on Riemannian manifolds by atomic or empirical ones is a classical task in approximation and complexity theory with a wide range of applications. Instead of point measures we are concerned with the approximation by measures supported on Lipschitz curves. Special attention is paid to push-forward measures of Lebesgue measures on the unit interval by such curves. Using the discrepancy as distance between measures, we prove optimal approximation rates in terms of the curve’s length and Lipschitz constant. Having established the theoretical convergence rates, we are interested in the numerical minimization of the discrepancy between a given probability measure ...
We consider the problem of approximating a function f from an Euclidean domain to a manifold M by sc...
We propose an analysis of the quality of the fitting method proposed in Gousenbourger et al., 2017 (...
We associate certain probability measures on R to geodesics in the space HL of positively curved met...
In this talk, we will discuss a way of approximating images living on a manifold with Lipschitz cont...
This thesis examines manifold approximation, specifically in one and two dimensions, by constructing...
We present an algorithm for approximating a function defined over a d-dimensional manifold utilizing...
We address the problem of estimating optimal curves for interpolation, smoothing, and prediction of ...
ABSTRACT. We consider approximating a measure by a parameterized curve subject to length penalizatio...
<p>We consider approximating a measure by a parameterized curve subject to length penalization. That...
Nous nous intéressons à la comparaison de formes de courbes lisses prenant leurs valeurs dans une va...
International audienceWe propose a fast and scalable algorithm to project a given density on a set o...
We derive a variational model to fit a composite Bézier curve to a set of data points on a Riemannia...
In this paper, we prove a finite dimensional approximation scheme for the Wiener measure on closed R...
Abstract. In this paper we study algorithms to find a Gaussian approximation to a target measure def...
International audienceGiven data points p0,. .. , pN on a manifold M and time instants 0 = t0 < t1 <...
We consider the problem of approximating a function f from an Euclidean domain to a manifold M by sc...
We propose an analysis of the quality of the fitting method proposed in Gousenbourger et al., 2017 (...
We associate certain probability measures on R to geodesics in the space HL of positively curved met...
In this talk, we will discuss a way of approximating images living on a manifold with Lipschitz cont...
This thesis examines manifold approximation, specifically in one and two dimensions, by constructing...
We present an algorithm for approximating a function defined over a d-dimensional manifold utilizing...
We address the problem of estimating optimal curves for interpolation, smoothing, and prediction of ...
ABSTRACT. We consider approximating a measure by a parameterized curve subject to length penalizatio...
<p>We consider approximating a measure by a parameterized curve subject to length penalization. That...
Nous nous intéressons à la comparaison de formes de courbes lisses prenant leurs valeurs dans une va...
International audienceWe propose a fast and scalable algorithm to project a given density on a set o...
We derive a variational model to fit a composite Bézier curve to a set of data points on a Riemannia...
In this paper, we prove a finite dimensional approximation scheme for the Wiener measure on closed R...
Abstract. In this paper we study algorithms to find a Gaussian approximation to a target measure def...
International audienceGiven data points p0,. .. , pN on a manifold M and time instants 0 = t0 < t1 <...
We consider the problem of approximating a function f from an Euclidean domain to a manifold M by sc...
We propose an analysis of the quality of the fitting method proposed in Gousenbourger et al., 2017 (...
We associate certain probability measures on R to geodesics in the space HL of positively curved met...