Probabilities on Cones of Multimatrix Variate Distributions and Elliptical Affine Shape Distributions Under Real Normed Division Algebras
| dc.contributor.affiliation | Caro-Lopera F.J., Faculty of Basic Sciences, Universidad de Medellín, Carrera 87 No.30-65, of. 4-216, Medellín, Colombia | |
| dc.contributor.affiliation | Díaz-García J.A., Facultad de Zootecnia y Ecología, Universidad Autónoma de Chihuahua, Periférico Francisco R. Almada Km 1, Zootecnia, Chihuahua, Chihuahua, 33820, Mexico | |
| dc.contributor.author | Caro-Lopera F.J. | |
| dc.contributor.author | Díaz-García J.A. | |
| dc.date.accessioned | 2025-09-08T14:23:22Z | |
| dc.date.available | 2025-09-08T14:23:22Z | |
| dc.date.issued | 2025 | |
| dc.description | This work proposes probabilities of multimatrix distributions and simplifies the affine shape theory under the setting of real normed division algebras and elliptically contoured laws. The contribution of the paper, valid for all real normed division algebras and elliptical distributions, involves: 1) computable probabilities for several matrices in multimatrix distributions | |
| dc.description | 2) computable probability for several multimatrix variate generalised Wishart distributions | |
| dc.description | 3) probability study of the multimatrix variate Pearson type II distribution | |
| dc.description | 4) a new setting for generalised estatistical shape theory | |
| dc.description | 5) a dynamic molecular docking based on matrix probabilities, under dependent samples of a reported inhibitor in two cavities of SARS-CoV-2. © Indian Statistical Institute 2025. | |
| dc.identifier.doi | 10.1007/s13171-025-00402-z | |
| dc.identifier.instname | instname:Universidad de Medellín | spa |
| dc.identifier.issn | 0976836X | |
| dc.identifier.reponame | reponame:Repositorio Institucional Universidad de Medellín | spa |
| dc.identifier.repourl | repourl:https://repository.udem.edu.co/ | |
| dc.identifier.uri | http://hdl.handle.net/11407/9054 | |
| dc.language.iso | eng | |
| dc.publisher.faculty | Facultad de Ciencias Básicas | spa |
| dc.relation.isversionof | https://www.scopus.com/inward/record.uri?eid=2-s2.0-105012258748&doi=10.1007%2fs13171-025-00402-z&partnerID=40&md5=929a331487fc2286a3541392a4f5eb5d | |
| dc.relation.references | Arias-Serna M.A., Mesures De Risque Matrice-Variable, Vecteur-Variable Et univarié Et Aspects Connexes, (2021) | |
| dc.relation.references | Arias-Serna M.A., Caro-Lopera F.J., Loubes J.M., Matrix-Variate Value-at-Risk: Generalized Beta and F Distributions, (2024) | |
| dc.relation.references | Arias-Serna M.A., Caro-Lopera F.J., Loubes J.M., Risk measures a generalization from the univariate to the matrix variate, J. Risk, 23, pp. 1-20, (2021) | |
| dc.relation.references | Baez J.C., The octonions. Bull. Amer. Math. Soc, 39, pp. 145-205, (2002) | |
| dc.relation.references | Caro-Lopera F.J., The impossibility of a recurrence construction of the invariant polynomials by using the Laplace-Beltrami operator, Far East J. Math. Sci, 100, pp. 1265-1288, (2016) | |
| dc.relation.references | Caro-Lopera F.J., Families of computable matrix-variate polynomial distributions and applications, Far East J. Math. Sci, 108, pp. 285-325, (2018) | |
| dc.relation.references | Caro-Lopera F.J., Diaz-Garcia J.A., Matrix Kummer-Pearson VII relation and polynomial pearson VII configuration density, J. Iran. Stat. Soc, 11, pp. 217-230, (2012) | |
| dc.relation.references | Caro-Lopera F.J., Diaz-Garcia J.A., Gonzalez-Farias G., Noncentral elliptical configuration density, J. Multivar. Anal, 101, pp. 32-43, (2010) | |
| dc.relation.references | Caro-Lopera F.J., Gonzalez-Farias G., Balakrishnan N., Determinants, permanents and some applications to statistical shape theory, J. Multivar. Anal, 114, pp. 29-39, (2013) | |
| dc.relation.references | Caro-Lopera F.J., Gonzalez-Farias G., Balakrishnan N., Matrix-variate distribution theory under elliptical models-4: Joint distribution of latent roots of covariance matrix and the largest and smallest latent roots, J. Multivar. Anal, 145, pp. 224-235, (2016) | |
| dc.relation.references | Clay Mathematics Institute of Cambridge. The Millennium Prize Problems | |
| dc.relation.references | Constantine A.G., Some non-central distribution problems in multivariate analysis, Ann. Math. Statist, 34, pp. 1270-1285, (1963) | |
| dc.relation.references | Davis A.W., Invariant polynomials with two matrix arguments, extending the zonal polynomials, Multivariate Analysis —V, pp. 287-299, (1980) | |
| dc.relation.references | Davis A.W., Invariant polynomials with two matrix arguments extending the zonal polynomials: Applications to multivariate distribution theory, Ann. Inst. Stat. Math, 31, pp. 465-485, (1979) | |
| dc.relation.references | Diaz-Garcia J.A., Caro-Lopera F.J., Perez Ramirez F.O., Multivector variate distributions: An application in Finance. Sankhyā, 84-A Part, 2, pp. 534-555, (2022) | |
| dc.relation.references | Diaz-Garcia J.A., Caro-Lopera F.J., Multimatricvariate distribution under elliptical models, J. Stat. Plann. Infer, pp. 109-117, (2022) | |
| dc.relation.references | Diaz-Garcia J.A., Caro-Lopera F.J., Multimatrix Variate Distributions, (2024) | |
| dc.relation.references | Diaz-Garcia J.A., Caro-Lopera F.J., . Multimatricvariate and multimatrix variate distributions based on elliptically contoured laws under real normed division algebras, (2024) | |
| dc.relation.references | Diaz-Garcia J.A., Caro-Lopera F.J., Elliptical affine shape distributions for real normed division algebras, J. Multivar. Anal, 144, pp. 139-149, (2016) | |
| dc.relation.references | Diaz-Garcia J.A., Gutierrez-Jaimez R., Spherical ensembles, Linear Algebra Appl, 438, pp. 3174-3201, (2013) | |
| dc.relation.references | Dray T., Manogue C.A., The exceptional Jordan eigenvalue problem, Inter. J. Theo. Phys, 38, pp. 2901-2916, (1999) | |
| dc.relation.references | Edelman A., Rao R.R., Random matrix theory, Acta Numer, 14, pp. 233-297, (2005) | |
| dc.relation.references | Goodall K.I., Mardia K.V., Multivariate aspects of shape theory, Ann. Statist, 21, pp. 848-866, (1993) | |
| dc.relation.references | Gross K.I., Richards D.S.T.P., Special functions of matrix argument I: Algebraic induction zonal polynomials and hypergeometric functions, Trans. Amer. Math. Soc, 301, pp. 475-501, (1987) | |
| dc.relation.references | Gupta R.D., Richards D., Calculation of zonal polynomials of 3×3 positive definite symmetric matrices, Ann. Inst. Statist. Math. Part A, 31, pp. 207-213, (1978) | |
| dc.relation.references | Gupta A.K., Varga T., Elliptically Contoured Models in Statistics, (1993) | |
| dc.relation.references | Hardy G.H., Ramanujan S., Asymptotic formulaæ in combinatory analysis, Proc. Lond. Math. Soc, s2-17, pp. 75-115, (1918) | |
| dc.relation.references | Hilbert D., Mathematical problems, Bull. Amer. Math. Soc. (N.S.), 8, 10, pp. 437-479, (1902) | |
| dc.relation.references | James A.T., Distributions of matrix variates and latent roots derived from normal samples, Ann. Math. Statist, 35, pp. 475-501, (1964) | |
| dc.relation.references | James A.T., Calculation of zonal polynomial coefficients by use of the Laplace-Beltrami operator, Ann. Math. Statist, 39, pp. 1711-1718, (1968) | |
| dc.relation.references | Jin Z., Du X., Xu Y., Et al., Structure of Mpro from SARS-CoV-2 and discovery of its inhibitors, Nature, 582, pp. 289-293, (2020) | |
| dc.relation.references | Koev E., Edelman A., The efficient evaluation of the hypergeometric function of a matrix argument, Math. Comp, 75, pp. 833-846, (2006) | |
| dc.relation.references | Liu X., Zhang B., Jin Z., Yang H., Rao Z., The crystal structure of COVID-19 main protease in complex with an inhibitor N3, (2020) | |
| dc.relation.references | Muirhead R.J., Aspects of Multivariate Statistical Theory, (2005) | |
| dc.relation.references | Ramirez-Velasquez I., Bedoya-Calle A., Velez E., Caro-Lopera F., Shape theory applied to molecular docking and automatic localization of ligand binding pockets in large proteins, ACS Omega, 7, pp. 45991-46002, (2022) | |
| dc.relation.references | Trott O., Olson A., AutoDock Vina: Improving the speed and accuracy of docking with a new scoring function, efficient optimization, and multithreading, J. Comput. Chem, 31, (2009) | |
| dc.rights.acceso | Restricted access | |
| dc.rights.accessrights | info:eu-repo/semantics/restrictedAccess | |
| dc.source | Sankhya A | |
| dc.source | Sankhya A | |
| dc.source | Scopus | |
| dc.subject | Elliptical affine shape theory | |
| dc.subject | Matrix variate elliptical distributions | |
| dc.subject | Multimatrix variate distributions | |
| dc.subject | Probabilities on cones | |
| dc.subject | Real normed division algebras | |
| dc.subject | Zonal polynomials | |
| dc.title | Probabilities on Cones of Multimatrix Variate Distributions and Elliptical Affine Shape Distributions Under Real Normed Division Algebras | |
| dc.type | Article | |
| dc.type.local | Artículo | spa |
| dc.type.version | info:eu-repo/semantics/publishedVersion |