The depth of a multivariate observation assesses its degree of centrality with respect to a probability distribution, and thus it can be interpreted as a measurement of the fit of the observation wrt the distribution. If such depth is transformed into a (depth-based) rank, then we obtain a kind of p-value of a goodness-of-fit test run on a single observation. For a sample of observations, the goal is to combine their ranks in order to decide whether they were taken from some prescribed distribution. From the meta-analysis literature, it is well known that there does not exist a combination procedure for such p-values (or ranks) that outperforms the remaining ones in all possible scenarios. Here we explore several combination procedures of t...
We herein introduce variable selection procedures based on depth similarity, aimed at identifying a ...
summary:Data depth is an important concept of nonparametric approach to multivariate data analysis. ...
A maximum likelihood estimation procedure is developed for multidimensional scaling when (dis)simila...
The depth of a multivariate observation assesses its degree of centrality with respect to a probabil...
Data depth provides a natural means to rank multivariate vectors with respect to an underlying multi...
Abstract no. 303401Theme: Statistics: From Evidence to PolicyData depth provides a natural means to ...
Classical multivariate statistics measures the outlyingness of a point by its Mahalanobis distance f...
This thesis addresses a significant problem in numerous scientific fields - the challenge of determi...
Data depth provides a natural means to rank multivariate vectors with respect to an underlying multi...
Theme: Big Data and Statistical ComputingSession SS1R1 - Data DepthData depth provides a natural mea...
In this thesis the theory of depth functions is researched. Depth functions are functions that measu...
The statistical analysis of functional data is a growing need in many research areas. We propose a n...
Rank-based approaches are among the most popular nonparametric methods for univariate data in tackli...
We propose new concepts of statistical depth, multivariate quantiles, vector quantiles and ranks, ra...
We propose new concepts of statistical depth, multivariate quantiles, vector quantiles and ranks, ra...
We herein introduce variable selection procedures based on depth similarity, aimed at identifying a ...
summary:Data depth is an important concept of nonparametric approach to multivariate data analysis. ...
A maximum likelihood estimation procedure is developed for multidimensional scaling when (dis)simila...
The depth of a multivariate observation assesses its degree of centrality with respect to a probabil...
Data depth provides a natural means to rank multivariate vectors with respect to an underlying multi...
Abstract no. 303401Theme: Statistics: From Evidence to PolicyData depth provides a natural means to ...
Classical multivariate statistics measures the outlyingness of a point by its Mahalanobis distance f...
This thesis addresses a significant problem in numerous scientific fields - the challenge of determi...
Data depth provides a natural means to rank multivariate vectors with respect to an underlying multi...
Theme: Big Data and Statistical ComputingSession SS1R1 - Data DepthData depth provides a natural mea...
In this thesis the theory of depth functions is researched. Depth functions are functions that measu...
The statistical analysis of functional data is a growing need in many research areas. We propose a n...
Rank-based approaches are among the most popular nonparametric methods for univariate data in tackli...
We propose new concepts of statistical depth, multivariate quantiles, vector quantiles and ranks, ra...
We propose new concepts of statistical depth, multivariate quantiles, vector quantiles and ranks, ra...
We herein introduce variable selection procedures based on depth similarity, aimed at identifying a ...
summary:Data depth is an important concept of nonparametric approach to multivariate data analysis. ...
A maximum likelihood estimation procedure is developed for multidimensional scaling when (dis)simila...