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Keywords = multivariate generalized Mittag–Leffler distribution

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19 pages, 287 KB  
Article
A Generalized Nonlinear Bagley–Torvik Equation in Distributions
by Chenkuan Li, Ehsan Pourhadi and Alison Gray
Mathematics 2026, 14(10), 1766; https://doi.org/10.3390/math14101766 - 21 May 2026
Viewed by 443
Abstract
This paper investigates the fractional calculus of distributions supported on R+ in the sense of L. Schwartz, based on distributional convolutions. We further study a generalized Bagley–Torvik equation involving an arbitrary number of fractional derivative terms with orders in the interval [...] Read more.
This paper investigates the fractional calculus of distributions supported on R+ in the sense of L. Schwartz, based on distributional convolutions. We further study a generalized Bagley–Torvik equation involving an arbitrary number of fractional derivative terms with orders in the interval (0,2). The existence and uniqueness of solutions for its nonlinear form are established in a space of continuous functions by applying Banach’s contraction principle, the Leray–Schauder fixed-point theorem, inverse operators, and the multivariate Mittag–Leffler function. Finally, several examples are presented, in which the values of multivariate Mittag–Leffler functions are computed to illustrate the main results. Full article
20 pages, 347 KB  
Article
On a Multivariate Analog of the Zolotarev Problem
by Yury Khokhlov and Victor Korolev
Mathematics 2021, 9(15), 1728; https://doi.org/10.3390/math9151728 - 22 Jul 2021
Viewed by 2174
Abstract
A generalized multivariate problem due to V. M. Zolotarev is considered. Some related results on geometric random sums and (multivariate) geometric stable distributions are extended to a more general case of “anisotropic” random summation where sums of independent random vectors with multivariate random [...] Read more.
A generalized multivariate problem due to V. M. Zolotarev is considered. Some related results on geometric random sums and (multivariate) geometric stable distributions are extended to a more general case of “anisotropic” random summation where sums of independent random vectors with multivariate random index having a special multivariate geometric distribution are considered. Anisotropic-geometric stable distributions are introduced. It is demonstrated that these distributions are coordinate-wise scale mixtures of elliptically contoured stable distributions with the Marshall–Olkin mixing distributions. The corresponding “anisotropic” analogs of multivariate Laplace, Linnik and Mittag–Leffler distributions are introduced. Some relations between these distributions are presented. Full article
(This article belongs to the Special Issue Characterization of Probability Distributions)
29 pages, 459 KB  
Article
Multivariate Scale-Mixed Stable Distributions and Related Limit Theorems
by Yury Khokhlov, Victor Korolev and Alexander Zeifman
Mathematics 2020, 8(5), 749; https://doi.org/10.3390/math8050749 - 8 May 2020
Cited by 8 | Viewed by 3632
Abstract
In the paper, multivariate probability distributions are considered that are representable as scale mixtures of multivariate stable distributions. Multivariate analogs of the Mittag–Leffler distribution are introduced. Some properties of these distributions are discussed. The main focus is on the representations of the corresponding [...] Read more.
In the paper, multivariate probability distributions are considered that are representable as scale mixtures of multivariate stable distributions. Multivariate analogs of the Mittag–Leffler distribution are introduced. Some properties of these distributions are discussed. The main focus is on the representations of the corresponding random vectors as products of independent random variables and vectors. In these products, relations are traced of the distributions of the involved terms with popular probability distributions. As examples of distributions of the class of scale mixtures of multivariate stable distributions, multivariate generalized Linnik distributions and multivariate generalized Mittag–Leffler distributions are considered in detail. Their relations with multivariate ‘ordinary’ Linnik distributions, multivariate normal, stable and Laplace laws as well as with univariate Mittag–Leffler and generalized Mittag–Leffler distributions are discussed. Limit theorems are proved presenting necessary and sufficient conditions for the convergence of the distributions of random sequences with independent random indices (including sums of a random number of random vectors and multivariate statistics constructed from samples with random sizes) to scale mixtures of multivariate elliptically contoured stable distributions. The property of scale-mixed multivariate elliptically contoured stable distributions to be both scale mixtures of a non-trivial multivariate stable distribution and a normal scale mixture is used to obtain necessary and sufficient conditions for the convergence of the distributions of random sums of random vectors with covariance matrices to the multivariate generalized Linnik distribution. Full article
(This article belongs to the Special Issue Stability Problems for Stochastic Models: Theory and Applications)
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