La Trobe

Spherically Restricted Random Hyperbolic Diffusion

Download (1.62 MB)
journal contribution
posted on 2021-01-18, 03:02 authored by Philip BroadbridgePhilip Broadbridge, Alexander Kolesnik, Nikolai Leonenko, Andriy OlenkoAndriy Olenko, Dareen OmariDareen Omari

This paper investigates solutions of hyperbolic diffusion equations in R3 with random initial conditions. The solutions are given as spatial-temporal random fields. Their restrictions to the unit sphere S2 are studied. All assumptions are formulated in terms of the angular power spectrum or the spectral measure of the random initial conditions. Approximations to the exact solutions are given. Upper bounds for the mean-square convergence rates of the approximation fields are obtained. The smoothness properties of the exact solution and its approximation are also investigated. It is demonstrated that the Holder-type continuity of the solution depends on the decay of the angular power spectrum. Conditions on the spectral measure of initial conditions that guarantee short-or long-range dependence of the solutions are given. Numerical studies are presented to verify the theoretical findings.

Funding

This research was supported under the Australian Research Council’s Discovery Project DP160101366. A. Kolesnik was supported in part in the framework of the research project 20.80009.5007.13. This research includes simulation studies using the computational cluster Raijin of the National Computational Infrastructure (NCI), which is supported by the Australian Government and La Trobe University.

History

Publication Date

2020-02-14

Journal

Entropy

Volume

22

Issue

2

Article Number

217

Pagination

31p.

Publisher

MDPI

ISSN

1099-4300

Rights Statement

© 2020 by the authors. Licensee MDPI, Basel, Switzerland. This article is an open access article distributed under the terms and conditions of the Creative Commons Attribution (CC BY) license: http://creativecommons.org/licenses/by/4.0/