A new family of copulas is introduced that provides flexible dependence structure while being tractable and simple to use for multivariate discrete data modeling. The construction exploits finite mixtures of uncorrelated normal distributions. Accordingly, the cumulative distribution function is simply the product of univariate normal distributions. At the same time, however, the mixing operation introduces association. The properties of the new family of copulas are examined and a concrete application is used to show its applicability
Recently, there has been an increasing interest on the combination of copulas with a finite mixture ...
So called pair copula constructions (PCCs), specifying multivariate distributions only in terms of b...
The modern pair-copula construction (PCC) approach, which defines complex multivariate structures th...
The identification of an appropriate multivariate copula for capturing the dependence structure in m...
There exist many bivariate parametric copulas to model bivariate data with different dependence feat...
In specifying a multivariate discrete distribution via the NORmal To Anything (NORTA) method, a prob...
In specifying a multivariate discrete distribution via the the NORmal To Anything (NORTA) method, a ...
This thesis contributes to research in multivariate statistics by developing regular vine copula-bas...
Copulas have now become ubiquitous statistical tools for describing, analysing and modelling depende...
The majority of model-based clustering techniques is based on multivariate Normal models and their v...
Bayesian nonparametric models based on infinite mixtures of density kernels have been recently gaini...
Studying associations among multivariate outcomes is an interesting problem in statistical science. ...
International audienceCopulas are a useful tool to model multivariate distributions. While there exi...
A multivariate regular varying distribution can be characterized by its marginals and a finite measu...
In many scientific fields, researchers are concerned with multivariate random variables. Although qu...
Recently, there has been an increasing interest on the combination of copulas with a finite mixture ...
So called pair copula constructions (PCCs), specifying multivariate distributions only in terms of b...
The modern pair-copula construction (PCC) approach, which defines complex multivariate structures th...
The identification of an appropriate multivariate copula for capturing the dependence structure in m...
There exist many bivariate parametric copulas to model bivariate data with different dependence feat...
In specifying a multivariate discrete distribution via the NORmal To Anything (NORTA) method, a prob...
In specifying a multivariate discrete distribution via the the NORmal To Anything (NORTA) method, a ...
This thesis contributes to research in multivariate statistics by developing regular vine copula-bas...
Copulas have now become ubiquitous statistical tools for describing, analysing and modelling depende...
The majority of model-based clustering techniques is based on multivariate Normal models and their v...
Bayesian nonparametric models based on infinite mixtures of density kernels have been recently gaini...
Studying associations among multivariate outcomes is an interesting problem in statistical science. ...
International audienceCopulas are a useful tool to model multivariate distributions. While there exi...
A multivariate regular varying distribution can be characterized by its marginals and a finite measu...
In many scientific fields, researchers are concerned with multivariate random variables. Although qu...
Recently, there has been an increasing interest on the combination of copulas with a finite mixture ...
So called pair copula constructions (PCCs), specifying multivariate distributions only in terms of b...
The modern pair-copula construction (PCC) approach, which defines complex multivariate structures th...