Detail publikace
Characteristic function and moment generating function of multivariate folded normal distribution
BENKO, M. HÜBNEROVÁ, Z. WITKOVSKÝ, V.
Anglický název
Characteristic function and moment generating function of multivariate folded normal distribution
Typ
článek v časopise ve Web of Science, Jimp
Jazyk
en
Originální abstrakt
In this study, we derive the characteristic function of the multivariate folded normal distribution, a distribution that arises when the magnitudes-but not the signs-of a normally distributed random vector are of interest. The folded normal distribution is widely applicable across various fields. Thus, obtaining an analytical expression for its characteristic function is pivotal in understanding its fundamental properties. Moreover, this allows one to facilitate numerical evaluations of complex distributions involving linear combinations of absolute values of dependent normal variables. The derivation is based on a novel expression of the moment generating function, formulated using the cumulative distribution function of the multivariate normal distribution. To validate our findings, we present two examples using our MATLAB implementation. We compare the characteristic function for the sum of the absolute values of elements of a multivariate normal vector with the simulated empirical counterpart. Additionally, we derive the second mixed moment of the bivariate folded normal distribution from the moment generating function, demonstrating its agreement with known theoretical expressions.
Anglický abstrakt
In this study, we derive the characteristic function of the multivariate folded normal distribution, a distribution that arises when the magnitudes-but not the signs-of a normally distributed random vector are of interest. The folded normal distribution is widely applicable across various fields. Thus, obtaining an analytical expression for its characteristic function is pivotal in understanding its fundamental properties. Moreover, this allows one to facilitate numerical evaluations of complex distributions involving linear combinations of absolute values of dependent normal variables. The derivation is based on a novel expression of the moment generating function, formulated using the cumulative distribution function of the multivariate normal distribution. To validate our findings, we present two examples using our MATLAB implementation. We compare the characteristic function for the sum of the absolute values of elements of a multivariate normal vector with the simulated empirical counterpart. Additionally, we derive the second mixed moment of the bivariate folded normal distribution from the moment generating function, demonstrating its agreement with known theoretical expressions.
Klíčová slova anglicky
Absolute value; Characteristic function; Folded normal distribution; Moment generating function; Multivariate normal distribution; Owen's normal integral
Vydáno
10.05.2025
Nakladatel
SPRINGER
Místo
NEW YORK
ISSN
0932-5026
Ročník
66
Číslo
4
Počet stran
23
BIBTEX
@article{BUT198334,
author="Matej {Benko} and Zuzana {Hübnerová} and Viktor {Witkovský},
title="Characteristic function and moment generating function of multivariate folded normal distribution",
year="2025",
volume="66",
number="4",
month="May",
publisher="SPRINGER",
address="NEW YORK",
issn="0932-5026"
}