We introduce classifiers based on directional quantiles. We derive theoretical results for selecting optimal quantile levels given a direction, and, conversely, an optimal direction given a quantile level. We also show that the probability of correct classification of the proposed classifier converges to one if population distributions differ by at most a location shift and if the number of directions is allowed to diverge at the same rate of the problem’s dimension. We illustrate the satisfactory performance of our proposed classifiers in both small and high dimensional settings via a simulation study and a real data example. The code implementing the proposed methods is publicly available in the R package Qtools
In this paper, we use quantization to construct a nonparametric estimator of conditional quantiles o...
In this paper, we use quantization to construct a nonparametric estimator of conditional quantiles o...
This paper outlines a unified framework for high dimensional variable selection for classifi-cation ...
Classification with small samples of high-dimensional data is important in many application areas. Q...
In this thesis we study a special type of multidimentional data - directional data. The main part of...
AbstractA new projection-based definition of quantiles in a multivariate setting is proposed. This a...
In this paper, we introduce a new concept of quantiles and depth for directional (circular and spher...
In this paper, we develop a reduced form multivariate quantile model, using a directional quantile f...
summary:Although many words have been written about two recent directional (regression) quantile con...
This paper sheds some new light on the multivariate (projectional) quantiles recently introduced in ...
Vector Quantizers (VQ) can be exploited for classification. In particular the gradient of the error ...
Vector Quantizers (VQ) can be exploited for classification. In particular the gradient of the error ...
This thesis deals with the problem of classification in general, with a particular focus on heavy-ta...
summary:The main goal of supervised learning is to construct a function from labeled training data w...
Abstract — Adaptive sampling theory has shown that, with proper assumptions on the signal class, alg...
In this paper, we use quantization to construct a nonparametric estimator of conditional quantiles o...
In this paper, we use quantization to construct a nonparametric estimator of conditional quantiles o...
This paper outlines a unified framework for high dimensional variable selection for classifi-cation ...
Classification with small samples of high-dimensional data is important in many application areas. Q...
In this thesis we study a special type of multidimentional data - directional data. The main part of...
AbstractA new projection-based definition of quantiles in a multivariate setting is proposed. This a...
In this paper, we introduce a new concept of quantiles and depth for directional (circular and spher...
In this paper, we develop a reduced form multivariate quantile model, using a directional quantile f...
summary:Although many words have been written about two recent directional (regression) quantile con...
This paper sheds some new light on the multivariate (projectional) quantiles recently introduced in ...
Vector Quantizers (VQ) can be exploited for classification. In particular the gradient of the error ...
Vector Quantizers (VQ) can be exploited for classification. In particular the gradient of the error ...
This thesis deals with the problem of classification in general, with a particular focus on heavy-ta...
summary:The main goal of supervised learning is to construct a function from labeled training data w...
Abstract — Adaptive sampling theory has shown that, with proper assumptions on the signal class, alg...
In this paper, we use quantization to construct a nonparametric estimator of conditional quantiles o...
In this paper, we use quantization to construct a nonparametric estimator of conditional quantiles o...
This paper outlines a unified framework for high dimensional variable selection for classifi-cation ...