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Autori principali: Angstmann, Christopher N., Burney, Stuart-James M., Han, Daniel S., Henry, Bruce I., Huang, Boris Z., Xu, Zhuang
Natura: Preprint
Pubblicazione: 2024
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Accesso online:https://arxiv.org/abs/2406.08777
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author Angstmann, Christopher N.
Burney, Stuart-James M.
Han, Daniel S.
Henry, Bruce I.
Huang, Boris Z.
Xu, Zhuang
author_facet Angstmann, Christopher N.
Burney, Stuart-James M.
Han, Daniel S.
Henry, Bruce I.
Huang, Boris Z.
Xu, Zhuang
contents In this work, exact solutions are derived for an integer- and fractional-order time-delayed diffusion equation with arbitrary initial conditions. The solutions are obtained using Fourier transform methods in conjunction with the known properties of delay functions. It is observed that the solutions do not exhibit infinite speed of propagation for smooth initial conditions that are bounded and positive. Sufficient conditions on the initial condition are also established such that the finite time blowup of the solutions can be explicitly calculated. Examples are provided that highlight the contrasting behaviours of these exact solutions with the known dynamics of solutions to the standard diffusion equation.
format Preprint
id arxiv_https___arxiv_org_abs_2406_08777
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Finite Time Blowup of Integer- and Fractional-Order Time-Delayed Diffusion Equations
Angstmann, Christopher N.
Burney, Stuart-James M.
Han, Daniel S.
Henry, Bruce I.
Huang, Boris Z.
Xu, Zhuang
Analysis of PDEs
35R25, 35C10, 34K06, 34K37, 33E20, 42A38
In this work, exact solutions are derived for an integer- and fractional-order time-delayed diffusion equation with arbitrary initial conditions. The solutions are obtained using Fourier transform methods in conjunction with the known properties of delay functions. It is observed that the solutions do not exhibit infinite speed of propagation for smooth initial conditions that are bounded and positive. Sufficient conditions on the initial condition are also established such that the finite time blowup of the solutions can be explicitly calculated. Examples are provided that highlight the contrasting behaviours of these exact solutions with the known dynamics of solutions to the standard diffusion equation.
title Finite Time Blowup of Integer- and Fractional-Order Time-Delayed Diffusion Equations
topic Analysis of PDEs
35R25, 35C10, 34K06, 34K37, 33E20, 42A38
url https://arxiv.org/abs/2406.08777