Your search keyword '"Anuradha Roy"' showing total 3 results

1. Linear discrimination for multi-level multivariate data with separable means and jointly equicorrelated covariance structure

Author

Ricardo Leiva and Anuradha Roy

Subjects

Statistics and Probability, Multiple discriminant analysis, education.field_of_study, Applied Mathematics, Population, Multivariate normal distribution, Covariance, Linear discriminant analysis, Discriminant, Discriminant function analysis, Optimal discriminant analysis, Statistics, Statistics, Probability and Uncertainty, education, Mathematics

Abstract

In this article we study a linear discriminant function of multiple m -variate observations at u -sites and over v -time points under the assumption of multivariate normality. We assume that the m -variate observations have a separable mean vector structure and a “jointly equicorrelated covariance” structure. The new discriminant function is very effective in discriminating individuals in a small sample scenario. No closed-form expression exists for the maximum likelihood estimates of the unknown population parameters, and their direct computation is nontrivial. An iterative algorithm is proposed to calculate the maximum likelihood estimates of these unknown parameters. A discriminant function is also developed for unstructured mean vectors. The new discriminant functions are applied to simulated data sets as well as to a real data set. Results illustrating the benefits of the new classification methods over the traditional one are presented.

Published

2011

2. Classification rules for triply multivariate data with an AR(1) correlation structure on the repeated measures over time

Author

Anuradha Roy and Ricardo Leiva

Subjects

Statistics and Probability, education.field_of_study, Multivariate statistics, Multivariate analysis, Covariance matrix, Applied Mathematics, Population, Multivariate normal distribution, Covariance, Linear discriminant analysis, Classification rule, Statistics, Statistics, Probability and Uncertainty, education, Mathematics

Abstract

In this article we study the problem of classification of three-level multivariate data, where multiple q -variate observations are measured on u -sites and over p -time points, under the assumption of multivariate normality. The new classification rules with certain structured and unstructured mean vectors and covariance structures are very efficient in small sample scenario, when the number of observations is not adequate to estimate the unknown variance–covariance matrix. These classification rules successfully model the correlation structure on successive repeated measurements over time. Computation algorithms for maximum likelihood estimates of the unknown population parameters are presented. Simulation results show that the introduction of sites in the classification rules improves their performance over the existing classification rules without the sites.

Published

2009

3. On discrimination and classification with multivariate repeated measures data

Author

Ravindra Khattree and Anuradha Roy

Subjects

Statistics and Probability, Multivariate statistics, education.field_of_study, Multivariate analysis, Covariance matrix, Applied Mathematics, Population, Covariance, Linear discriminant analysis, Set (abstract data type), Classification rule, Statistics, Statistics, Probability and Uncertainty, education, Mathematics

Abstract

We study the problem of classification with multiple q-variate observations with and without time effect on each individual. We develop new classification rules for populations with certain structured and unstructured mean vectors and under certain covariance structures. The new classification rules are effective when the number of observations is not large enough to estimate the variance–covariance matrix. Computational schemes for maximum likelihood estimates of required population parameters are given. We apply our findings to two real data sets as well as to a simulated data set.

Published

2005