Directional data are constrained to lie on the unit sphere of ℝq for some q ≥ 2. To address the lack of a natural ordering for such data, depth functions have been defined on spheres. However, the depths available either lack flexibility or are so computationally expensive that they can only be used for very small dimensions q. In this work, we improve on this by introducing a class of distance-based depths for directional data. Irrespective of the distance adopted, these depths can easily be computed in high dimensions too. We derive the main structural properties of the proposed depths and study how they depend on the distance used. We discuss the asymptotic and robustness properties of the corresponding deepest points. We show the practi...
In this thesis we study a special type of multidimentional data - directional data. The main part of...
In this paper, we introduce a new concept of quantiles and depth for directional (circular and spher...
The location depth (Tukey 1975) of a point relative to a p-dimensional data set Z of size n is defi...
Directional data are constrained to lie on the unit sphere of Rq, for some q ≥ 2. To address the lac...
Directional data are constrained to lie on the unit sphere of ℝ^q for some q ≥ 2. To address the la...
The notion of the interpoint depth is applied to spherical spaces by us-ing an appropriate angular d...
summary:The main goal of supervised learning is to construct a function from labeled training data w...
The DD-classifier, which has been extended to the classification of directional objects, is here in...
A non-parametric procedure based on the concept angular depth function is developed for dealing with...
Abstract We illustrate a depth-based approach in directional statistics, concentrat-ing on a promine...
Data depth is a statistical method whose primary aim is to order data of a reference space according...
The halfspace location depth of a point θ relative to a data set Xn is defined as the smallest numbe...
When working with high dimensional data, it is often essential to calculate the difference or "dista...
In this work, we revisit the curse of dimensionality, especially the concentration of the norm pheno...
In order to address high dimensional problems, a new ‘direction-aware’ metric is introduced in this ...
In this thesis we study a special type of multidimentional data - directional data. The main part of...
In this paper, we introduce a new concept of quantiles and depth for directional (circular and spher...
The location depth (Tukey 1975) of a point relative to a p-dimensional data set Z of size n is defi...
Directional data are constrained to lie on the unit sphere of Rq, for some q ≥ 2. To address the lac...
Directional data are constrained to lie on the unit sphere of ℝ^q for some q ≥ 2. To address the la...
The notion of the interpoint depth is applied to spherical spaces by us-ing an appropriate angular d...
summary:The main goal of supervised learning is to construct a function from labeled training data w...
The DD-classifier, which has been extended to the classification of directional objects, is here in...
A non-parametric procedure based on the concept angular depth function is developed for dealing with...
Abstract We illustrate a depth-based approach in directional statistics, concentrat-ing on a promine...
Data depth is a statistical method whose primary aim is to order data of a reference space according...
The halfspace location depth of a point θ relative to a data set Xn is defined as the smallest numbe...
When working with high dimensional data, it is often essential to calculate the difference or "dista...
In this work, we revisit the curse of dimensionality, especially the concentration of the norm pheno...
In order to address high dimensional problems, a new ‘direction-aware’ metric is introduced in this ...
In this thesis we study a special type of multidimentional data - directional data. The main part of...
In this paper, we introduce a new concept of quantiles and depth for directional (circular and spher...
The location depth (Tukey 1975) of a point relative to a p-dimensional data set Z of size n is defi...