Asymptotic behavior of sample mean location for manifolds

In a previous investigation we studied some asymptotic properties of the sample mean location on submanifolds of Euclidean space. The sample mean location generalizes least squares statistics to smooth compact submanifolds of Euclidean space. In this paper these properties are put into use. Tests f

In this note we consider some asymptotic properties of empirical mean direction on spheres. We do not require any symmetry for the underlying density. Thus our results provide the framework for an asymptotic inference regarding mean direction under very weak model assumptions. Mean direction is a sp

A finite sample performance measure of multivariate location estimators is introduced based on ''tail behavior''. The tail performance of multivariate ''monotone'' location estimators and the halfspace depth based ''non-monotone'' location estimators including the Tukey halfspace median and multivar