Your search keyword '"J. M. Fernández-Ponce"' showing total 15 results

1. On a new NBUE property in multivariate sense: An application.

Author

J. M. Fernández-Ponce, Franco Pellerey, and M. R. Rodríguez-Griñolo

Published

2011

2. New properties of the orthant convex-type stochastic orders

Author

J. M. Fernández-Ponce and M. R. Rodríguez-Griñolo

Subjects

Statistics and Probability, Class (set theory), 010102 general mathematics, Regular polygon, Univariate, Bivariate analysis, Type (model theory), Mixture model, 01 natural sciences, Orthant, Combinatorics, 010104 statistics & probability, Order (group theory), 0101 mathematics, Statistics, Probability and Uncertainty, Mathematics

Abstract

The orthant convex and concave orders have been studied in the literature as extensions of univariate variability orders. In this paper, new results are proposed for bivariate orthant convex-type orders between vectors. In particular, we prove that these orders cannot be considered as dependence orders since they fail to verify several desirable properties that any positive dependence order should satisfy. Among other results, the relationships between these orders under certain transformations are presented, as well as that the orthant convex orders between bivariate random vectors with the same means are sufficient conditions to order the corresponding covariances. We also show that establishing the upper orthant convex or lower orthant concave orders between two vectors in the same Frechet class is not equivalent to establishing these orders between the corresponding copulas except when marginals are uniform distributions. Several examples related with concordance measures, such as Kendall’s tau and Spearman’s rho, are also given, as are results on mixture models.

Published

2017

3. New multivariate aging notions based on the corrected orthant and the standard construction

Author

J. M. Fernández-Ponce, M. R. Rodríguez-Griñolo, and F. Pellery

Subjects

Statistics and Probability, Multivariate statistics, Multivariate analysis, 01 natural sciences, Dependence notions, 010104 statistics & probability, Corrected survival functions, Upper-corrected orthants, Multivariate analysis of variance, 0502 economics and business, Statistics, Econometrics, Statistics::Methodology, Multivariate t-distribution, 0101 mathematics, 050205 econometrics, Mathematics, 05 social sciences, Univariate, Orthant, Excess-wealth function, Multivariate aging notions, Multivariate u-quantiles, Multivariate stable distribution, Quantile

Abstract

Recently, some well-known univariate aging classes of lifetime distributions have been characterized by means of properties of their quantile functions and excess-wealth functions. The generalization of the univariate aging notions to the multivariate case involve, among other factors, appropriate definitions of multivariate quantiles or regression representation and related notions, which are able to correctly describe the intrinsic characteristic of the concepts of aging that should be generalized. The multivariate versions of these notions, which are characterized by using the multivariate u-quantiles and the multivariate excess-wealth function, are considered in this paper. Relationships between such multivariate aging classes are studied, and examples are provided.

Published

2015

4. On multivariate extensions of the conditional Value-at-Risk measure

Author

J. M. Fernández-Ponce, E. Di Bernardino, F. Palacios-Rodríguez, and M. R. Rodríguez-Griñolo

Subjects

Statistics and Probability, Deviation risk measure, Economics and Econometrics, Multivariate statistics, Univariate, Entropic value at risk, Dynamic risk measure, Expected shortfall, Coherent risk measure, Statistics, Econometrics, Statistics, Probability and Uncertainty, Value at risk, Mathematics

Abstract

CoVaR is a systemic risk measure proposed by Adrian and Brunnermeier (2011) able to measure a financial institution’s contribution to systemic risk and its contribution to the risk of other financial institutions. CoVaR stands for conditional Value-at-Risk, i.e. it indicates the Value at Risk for a financial institution that is conditional on a certain scenario. In this paper, two alternative extensions of the classic univariate Conditional Value-at-Risk are introduced in a multivariate setting. The two proposed multivariate CoVaRs are constructed from level sets of multivariate distribution functions ( resp. of multivariate survival distribution functions). These vector-valued measures have the same dimension as the underlying risk portfolio. Several characterizations of these new risk measures are provided in terms of the copula structure and stochastic orderings of the marginal distributions. Interestingly, these results are consistent with existing properties on univariate risk measures. Furthermore, comparisons between existent risk measures and the proposed multivariate CoVaR are developed. Illustrations are given in the class of Archimedean copulas. Estimation procedure for the multivariate proposed CoVaRs is illustrated in simulated studies and insurance real data.

Published

2015

5. On a new NBUE property in multivariate sense: An application

Author

Franco Pellerey, M. R. Rodríguez-Griñolo, and J. M. Fernández-Ponce

Subjects

Statistics and Probability, Multivariate statistics, Multivariate analysis, Generalization, Applied Mathematics, Multivariate View the MathML sourceu-quantiles, Univariate, Multivariate aging, Excess-wealth function, Upper corrected orthants, Tumor growth, Normal-Wishart distribution, Computational Mathematics, Computational Theory and Mathematics, Multivariate analysis of variance, Econometrics, Multivariate t-distribution, Multivariate stable distribution, Mathematics

Abstract

Since multivariate lifetime data frequently occur in applications, various properties of multivariate distributions have been previously considered to model and describe the main concepts of aging commonly considered in the univariate setting. The generalization of univariate aging notions to the multivariate case involves, among other factors, appropriate definitions of multivariate quantiles and related notions, which are able to correctly describe the intrinsic characteristics of the concepts of aging that should be generalized, and which provide useful tools in the applications. A new multivariate version of the well-known New Better than Used in Expectation univariate aging notion is provided, by means of the concepts of the upper corrected orthant and multivariate excess-wealth function. Some of its properties are described, with particular attention paid to those that can be useful in the analysis of real data sets. Finally, through an example it is illustrated how the new multivariate aging notion influences the final results in the analysis of data on tumor growth from the Comprehensive Cohort Study performed by the German Breast Cancer Study Group.

Published

2011

6. A characterization of the multivariate excess wealth ordering

Author

Franco Pellerey, M. R. Rodríguez-Griñolo, and J. M. Fernández-Ponce

Subjects

Statistics and Probability, Economics and Econometrics, Multivariate statistics, Excess wealth function, Expansion function, Multivariate dispersion ordering, Quantile, Upper-corrected orthant, Multivariate random variable, Univariate, Function (mathematics), Orthant, Econometrics, Economics, Multivariate t-distribution, Statistics, Probability and Uncertainty, Multivariate stable distribution

Abstract

In this paper, some new properties of the upper-corrected orthant of a random vector are proved. The univariate right-spread or excess wealth function, introduced by Fernandez-Ponce et al. (1996) , is extended to multivariate random vectors, and some properties of this multivariate function are studied. Later, this function was used to define the excess wealth ordering by Shaked and Shanthikumar (1998) and Fernandez-Ponce et al. (1998) . The multivariate excess wealth function enable us to define a new stochastic comparison which is weaker than the multivariate dispersion orderings. Also, some properties relating the multivariate excess wealth order with stochastic dependence are described.

Published

2011

7. MULTIVARIATE DISPERSION ORDER AND THE NOTION OF COPULA APPLIED TO THE MULTIVARIATE t-DISTRIBUTION

Author

P. Luque-Calvo, J. P. Arias-Nicolás, J. M. Fernández-Ponce, and Alfonso Suárez-Llorens

Subjects

Statistics and Probability, Multivariate statistics, Matrix t-distribution, Multivariate gamma function, Management Science and Operations Research, Industrial and Manufacturing Engineering, Normal-Wishart distribution, Multivariate analysis of variance, Statistics, Matrix normal distribution, Multivariate t-distribution, Statistics, Probability and Uncertainty, Mathematics, Multivariate stable distribution

Abstract

We study the concept of multivariate dispersion order, defined as the existence of an expansion function that maps a random vector to another one, for multivariate distributions with the same dependence structure. As a particular case, we can order the multivariate t-distribution family in dispersion sense. Finally, we use these results in the problem of detection and characterization of influential observations in regression analysis. This problem can often be used to compare two multivariate t-distributions.

Published

2005

8. A new approach to influence diagnostics in superpopulations

Author

J. M. Fernández-Ponce and R. Infante-Macías

Subjects

Statistics and Probability, Data collection, Computer science, Ecological Modeling, Bayesian probability, Regression analysis, computer.software_genre, Regression, Bayes' theorem, Frequentist inference, Outlier, Econometrics, Data mining, computer, Regression diagnostic

Abstract

Influence analysis on a model is one of the most studied topics from a frequentist viewpoint. Basically, disturbances are introduced into the model in order to measure the influence that one or a set of observations has on statistical analysis. The most common disturbance pattern is that of the omission of the observations whose influence is to be studied. In our model, we assume that there are only one or a few outliers because they may often be detected by deletion methods associated with regression diagnostics. However, these methods may fail in the presence of multiple outliers. In this case, the forward search can be used to avoid the masking and swamping problems. This article presents a Bayes approach for the influence analysis on a model in finite populations. Particularly, we develop a new approach to the study of influence in prediction theory, based on the given data rather than on the sampling design for data collection. We propose that the influence analysis on the superpopulation normal regression model and a measure based on the conditional bias from a Bayesian viewpoint is analyzed. Forward deletion formulae based on our influence measure can be defined, but this topic is beyond the scope of this article. Finally, we apply our proposed influence measure in a classic example for water contents of soil specimens. Copyright © 2005 John Wiley & Sons, Ltd.

Published

2005

9. AN AGING CONCEPT BASED ON MAJORIZATION

Author

Alfonso Suárez-Llorens and J. M. Fernández-Ponce

Subjects

Statistics and Probability, Combinatorics, Pure mathematics, Dominance order, Management Science and Operations Research, Statistics, Probability and Uncertainty, Majorization, Equivalence (measure theory), Industrial and Manufacturing Engineering, Unimodality, Randomness, Mathematics

Abstract

In this article, we introduce a new dispersion order weaker than the classic dispersion order discussed by Lewis and Thompson (1981). We study the equivalence of this order with the majorization order under the assumption of unimodality. Finally, we use this equivalence to characterize the IFR aging notion for unimodal distributions by means of the notion of decreasing in randomness.

Published

2003

10. Partial Orderings of Distributions Based on Right-Spread Functions

Author

J. M. Fernández-Ponce, José Muñoz-Pérez, and Subhash C. Kochar

Subjects

Statistics and Probability, General Mathematics, 010102 general mathematics, 01 natural sciences, Measure (mathematics), 010104 statistics & probability, Econometrics, Probability distribution, Statistical dispersion, Statistical physics, 0101 mathematics, Statistics, Probability and Uncertainty, Partially ordered set, Mathematics, Quantile

Abstract

In this paper we introduce a quantile dispersion measure. We use it to characterize different classes of ageing distributions. Based on the quantile dispersion measure, we propose a new partial ordering for comparing the spread or dispersion in two probability distributions. This new partial ordering is weaker than the well known dispersive ordering and it retains most of its interesting properties.

Published

1998

11. Characterization of lifetime distributions in the Ls-sense by a generalized spread

Author

J. M. Fernández-Ponce and José Muñoz-Pérez

Subjects

Statistics and Probability, Exponential distribution, Heavy-tailed distribution, Statistics, Statistical physics, Sense (electronics), Statistics, Probability and Uncertainty, Natural exponential family, Mathematics, Characterization (materials science)

Abstract

We characterize partial orderings between lifetime distributions by Ls-tailweight. We obtain some ageing properties by comparing distributions with the negative exponential distribution with unit mean. AMS classification: Primary 62N05; Secondary 62E10

Published

1997

12. Characterization of lifetime distributions based on a quantile dispersion measure

Author

J. M. Fernández-Ponce, José Muñoz-Pérez, and R. Infante-Macías

Subjects

Statistics and Probability, Applied Mathematics, Function (mathematics), Residual, Critical value, Measure (mathematics), Computational Mathematics, Computational Theory and Mathematics, Statistics, Test statistic, Statistical dispersion, Statistical physics, Power function, Mathematics, Quantile

Abstract

The tests for alternatives representing decreasing mean residual life and the property “new better than used in expectation” are developed. The tests are based on a property of the right-spread function to characterize different partial orderings between lifetime distributions. Power functions and critical values using simulation are also given.

Published

1996

13. Convex comparisons for random sums in random environments and applications

Author

J. M. Fernández-Ponce, Franco Pellerey, Eva María Ortega, and Universidad de Sevilla. Departamento de Estadística e Investigación Operativa

Subjects

Statistics and Probability, Random graph, Discrete mathematics, Random field, Random function, Random element, Management Science and Operations Research, Industrial and Manufacturing Engineering, Convexity, Random variate, Stochastic simulation, Random compact set, Statistics, Probability and Uncertainty, Mathematics

Abstract

Recently, Belzunce, Ortega, Pellerey, and Ruiz [3] have obtained stochastic comparisons in increasing componentwise convex order sense for vectors of random sums when the summands and number of summands depend on a common random environment, which prove how the dependence among the random environmental parameters influences the variability of vectors of random sums. The main results presented here generalize the results in Belzunce et al. [3] by considering vectors of parameters instead of a couple of parameters and the increasing directionally convex order. Results on stochastic directional convexity of families of random sums under appropriate conditions on the families of summands and number of summands are obtained, which lead to the convex comparisons between random sums mentioned earlier. Different applications in actuarial science, reliability, and population growth are also provided to illustrate the main results.

Published

2008

14. MULTIVARIATE DISPERSION ORDER AND THE NOTION OF COPULA APPLIED TO THE MULTIVARIATE t-DISTRIBUTION.

Author

J. P. Arias-Nicolás, J. M. Fernández-Ponce, P. Luque-Calvo, and A. Suárez-Llorens

Published

2005

15. A multivariate dispersion ordering based on quantiles more widely separated

Author

Alfonso Suárez-Llorens and J. M. Fernández-Ponce

Subjects

Statistics and Probability, Expansion, Numerical Analysis, Multivariate statistics, Multivariate analysis, Multivariate random variable, Multivariate ordering, Univariate, Matrix t-distribution, Multivariate analysis of variance, Conditional quantile, Statistics, Applied mathematics, Statistics::Methodology, Multivariate t-distribution, Statistics, Probability and Uncertainty, Corrected orthant, Multivariate stable distribution, Mathematics

Abstract

A multivariate dispersion ordering based on quantiles more widely separated is defined. This new multivariate dispersion ordering is a generalization of the classic univariate version. If we vary the ordering of the components in the multivariate random variable then the comparison could not be possible. We provide a characterization using a multivariate expansion function. The relationship among various multivariate orderings is also considered. Finally, several examples illustrate the method of this paper.