International audienceThe objective of this work is to propose a new algorithm to fit a sphere on a noisy 3D point cloud distributed around a complete or a truncated sphere. More precisely, we introduce a projected Robbins-Monro algorithm and its averaged version for estimating the center and the radius of the sphere. We give asymptotic results such as the almost sure convergence of these algorithms as well as the asymptotic normality of the averaged algorithm. Furthermore, some non-asymptotic results will be given, such as the rates of convergence in quadratic mean. Some numerical experiments show the efficiency of the proposed algorithm on simulated data for small to moderate sample sizes and for modeling an object in 3D
We are grateful to an Associate Editor and two anonymous Referees for a careful reading of the manus...
AbstractFor the problem of estimating under squared error loss the location parameter of a p-variate...
Suppose that a homogeneous system of spherical particles (d-spheres) with independent identically di...
International audienceThe objective of this work is to propose a new algorithm to fit a sphere on a ...
In this paper, we provide R-estimators of the location of a rotationally symmetric distribution on t...
We consider the deconvolution problem for densities supported on a (d-1)-dimensional sphere with unk...
We introduce a novel parameterization for spherical distributions that is based on a point located i...
In this paper, we provide R-estimators of the location of a rotationally symmetric distribution on t...
In this paper we consider the approximation of noisy scattered data on the sphere by radial basis fu...
In this thesis, we discuss some results on the distribution of points on the sphere, asymp-totically...
Suppose that a homogeneous system of spherical particles (d-spheres) with independent identically di...
Spherical targets are widely used in coordinate unification of large-scale combined measurements. Th...
International audienceThis letter studies a new expectation maximization (EM) algorithm to solve the...
. We investigate adaptive least squares approximation to scattered data given over the surface of th...
AbstractAn efficient and flexible algorithm for the spherical interpolation of large scattered data ...
We are grateful to an Associate Editor and two anonymous Referees for a careful reading of the manus...
AbstractFor the problem of estimating under squared error loss the location parameter of a p-variate...
Suppose that a homogeneous system of spherical particles (d-spheres) with independent identically di...
International audienceThe objective of this work is to propose a new algorithm to fit a sphere on a ...
In this paper, we provide R-estimators of the location of a rotationally symmetric distribution on t...
We consider the deconvolution problem for densities supported on a (d-1)-dimensional sphere with unk...
We introduce a novel parameterization for spherical distributions that is based on a point located i...
In this paper, we provide R-estimators of the location of a rotationally symmetric distribution on t...
In this paper we consider the approximation of noisy scattered data on the sphere by radial basis fu...
In this thesis, we discuss some results on the distribution of points on the sphere, asymp-totically...
Suppose that a homogeneous system of spherical particles (d-spheres) with independent identically di...
Spherical targets are widely used in coordinate unification of large-scale combined measurements. Th...
International audienceThis letter studies a new expectation maximization (EM) algorithm to solve the...
. We investigate adaptive least squares approximation to scattered data given over the surface of th...
AbstractAn efficient and flexible algorithm for the spherical interpolation of large scattered data ...
We are grateful to an Associate Editor and two anonymous Referees for a careful reading of the manus...
AbstractFor the problem of estimating under squared error loss the location parameter of a p-variate...
Suppose that a homogeneous system of spherical particles (d-spheres) with independent identically di...