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Auteurs principaux: Leonenko, N. N., Ruiz-Medina, M. D.
Format: Preprint
Publié: 2024
Sujets:
Accès en ligne:https://arxiv.org/abs/2402.09003
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author Leonenko, N. N.
Ruiz-Medina, M. D.
author_facet Leonenko, N. N.
Ruiz-Medina, M. D.
contents The asymptotic behavior of an extended family of integral geometric random functionals, including spatiotemporal Minkowski functionals under moving levels, is analyzed in this paper. Specifically, sojourn measures of spatiotemporal long-range dependence (LRD) Gaussian random fields are considered in this analysis. The limit results derived provide general reduction principles under increasing domain asymptotics in space and time. The case of time-varying thresholds is also studied. Thus, the family of morphological measures considered allows the statistical and geometrical analysis of random physical systems displaying structural changes over time. Motivated by cosmological applications, the derived results are applied to the context of sojourn measures of spatiotemporal spherical Gaussian random fields. The results are illustrated for some families of spatiotemporal Gaussian random fields displaying complex spatiotemporal dependence structures.
format Preprint
id arxiv_https___arxiv_org_abs_2402_09003
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle High-level moving excursions for spatiotemporal Gaussian random fields with long range dependence
Leonenko, N. N.
Ruiz-Medina, M. D.
Probability
60G10, 60G12, 60G18, 60G20, 60G22 (Primary). 60G60 (60G60)
The asymptotic behavior of an extended family of integral geometric random functionals, including spatiotemporal Minkowski functionals under moving levels, is analyzed in this paper. Specifically, sojourn measures of spatiotemporal long-range dependence (LRD) Gaussian random fields are considered in this analysis. The limit results derived provide general reduction principles under increasing domain asymptotics in space and time. The case of time-varying thresholds is also studied. Thus, the family of morphological measures considered allows the statistical and geometrical analysis of random physical systems displaying structural changes over time. Motivated by cosmological applications, the derived results are applied to the context of sojourn measures of spatiotemporal spherical Gaussian random fields. The results are illustrated for some families of spatiotemporal Gaussian random fields displaying complex spatiotemporal dependence structures.
title High-level moving excursions for spatiotemporal Gaussian random fields with long range dependence
topic Probability
60G10, 60G12, 60G18, 60G20, 60G22 (Primary). 60G60 (60G60)
url https://arxiv.org/abs/2402.09003