Zonoid trimming for multivariate distributions

Convex bodies generated by sublinear expectations of random vectors ⋮ On maximum depth classifiers: depth distribution approach ⋮ RR-plot: a descriptive tool for regression observations ⋮ Computation of projection regression depth and its induced median ⋮ Approximate computation of projection depths ⋮ Convergence of depth contours for multivariate datasets ⋮ A martingale bound for the entropy associated with a trimmed filtration on \(\mathbb{R}^d\) ⋮ Lift zonoid and barycentric representation on a Banach space with a cylinder measure ⋮ Exact computation of the halfspace depth ⋮ Choosing among notions of multivariate depth statistics ⋮ Some multivariate goodness of fit tests based on data depth ⋮ Depth-weighted Bayes classification ⋮ A notion of depth for sparse functional data ⋮ Lift zonoid order and functional inequalities ⋮ Robust estimation of location and scatter by pruning the minimum spanning tree ⋮ Classifying real-world data with the \(DD\alpha\)-procedure ⋮ Level sets of depth measures in abstract spaces ⋮ Depth and outliers for samples of sets and random sets distributions ⋮ Multivariate Kruskal_Wallis tests based on principal component score and latent source of independent component analysis ⋮ Testing for diagonal symmetry based on center-outward ranking ⋮ Depth level set estimation and associated risk measures ⋮ The zonoid region parameter depth ⋮ Trimmed regions induced by parameters of a probability ⋮ Fast implementation of the Tukey depth ⋮ Weighted-mean regions of a probability distribution ⋮ On the uniform consistency of the zonoid depth ⋮ Affine invariant integrated rank-weighted statistical depth: properties and finite sample analysis ⋮ Weighted-mean trimming of multivariate data ⋮ Unnamed Item ⋮ Directional bivariate quantiles: a robust approach based on the cumulative distribution function ⋮ A scatter matrix estimate based on the zonotope ⋮ Generalized and robustified empirical depths for multivariate data ⋮ On Combinatorial Depth Measures ⋮ Computing zonoid trimmed regions of bivariate data sets ⋮ An introduction to copula-based bivariate reliability Concepts ⋮ Multivariate Lorenz dominance based on zonoids ⋮ Nonparametric Imputation by Data Depth ⋮ Geometric disintegration and star-shaped distributions ⋮ Computing zonoid trimmed regions of dimension \(d>2\) ⋮ Halfspace depth and floating body ⋮ The expected convex hull trimmed regions of a sample ⋮ Fast nonparametric classification based on data depth ⋮ Depth-based classification for distributions with nonconvex support ⋮ A new concept of quantiles for directional data and the angular Mahalanobis depth ⋮ Affine invariant depth-based tests for the multivariate one-sample location problem ⋮ Expectile depth: theory and computation for bivariate datasets ⋮ On general notions of depth for regression ⋮ Consistency of the \(\alpha \)-trimming of a probability. Applications to central regions ⋮ Multivariate risks and depth-trimmed regions ⋮ Dirichlet depths for point process ⋮ Control charts based on parameter depths ⋮ The flood algorithm -- a multivariate, self-organizing-map-based, robust location and covariance estimator ⋮ Quantile curves and dependence structure for bivariate distributions ⋮ Intrinsic Data Depth for Hermitian Positive Definite Matrices ⋮ Simultaneous monitoring of origin and scale in left-bounded processes via depth ⋮ Convex and star-shaped sets associated with multivariate stable distributions. I: Moments and densities ⋮ Halfspace depth and regression depth characterize the empirical distribution ⋮ General notions of statistical depth function. ⋮ Commentary on ``From unidimensional to multidimensional inequality: a review ⋮ From Depth to Local Depth: A Focus on Centrality ⋮ Integral trimmed regions ⋮ Nonparametrically consistent depth-based classifiers ⋮ Computing halfspace depth contours based on the idea of a circular sequence ⋮ Combining dependent tests based on data depth with applications to the two-sample problem for data of arbitrary types