Saved in:
Bibliographic Details
Main Authors: de Hoop, Maarten, Kimura, Masato, Lin, Ching-Lung, Nakamura, Gen, Tanuma, Kazumi
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2406.18978
Tags: Add Tag
No Tags, Be the first to tag this record!
_version_ 1866917707231789056
author de Hoop, Maarten
Kimura, Masato
Lin, Ching-Lung
Nakamura, Gen
Tanuma, Kazumi
author_facet de Hoop, Maarten
Kimura, Masato
Lin, Ching-Lung
Nakamura, Gen
Tanuma, Kazumi
contents We provide a new method for constructing the anisotropic relaxation tensor and proving its exponential decay property for the extended Burgers model (abbreviated by EBM). The EBM is an important viscoelasticity model in rheology, and used in Earth and planetary sciences. Upon having this tensor, the EBM can be converted to a Boltzmann-type viscoelastic system of equations (abbreviated by BVS). Historically, the relaxation tensor for the EBM is derived by solving the constitutive equation using the Laplace transform. (We refer to this approach by the L-method.) Since inverting the inverse Laplace transform needs a partial fractions expansion, the L-method needs to assume that the EBM elasticity tensors satisfy a commutivity condition. The new method not only avoids this condition but also enables obtaining several important properties of the relaxation tensor, including its positivity, smoothness with respect to the time variable, its exponential decay property together with its derivative, and its causality. Furthermore, we show that the BVS converted from the EBM has the exponential decay property. That is, any solution for its initial boundary value problem with homogeneous boundary data and source decays exponentially as time tends to infinity.
format Preprint
id arxiv_https___arxiv_org_abs_2406_18978
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Anisotropic extended Burgers model, its relaxation tensor and properties of the associated Boltzmann viscoelastic system
de Hoop, Maarten
Kimura, Masato
Lin, Ching-Lung
Nakamura, Gen
Tanuma, Kazumi
Analysis of PDEs
We provide a new method for constructing the anisotropic relaxation tensor and proving its exponential decay property for the extended Burgers model (abbreviated by EBM). The EBM is an important viscoelasticity model in rheology, and used in Earth and planetary sciences. Upon having this tensor, the EBM can be converted to a Boltzmann-type viscoelastic system of equations (abbreviated by BVS). Historically, the relaxation tensor for the EBM is derived by solving the constitutive equation using the Laplace transform. (We refer to this approach by the L-method.) Since inverting the inverse Laplace transform needs a partial fractions expansion, the L-method needs to assume that the EBM elasticity tensors satisfy a commutivity condition. The new method not only avoids this condition but also enables obtaining several important properties of the relaxation tensor, including its positivity, smoothness with respect to the time variable, its exponential decay property together with its derivative, and its causality. Furthermore, we show that the BVS converted from the EBM has the exponential decay property. That is, any solution for its initial boundary value problem with homogeneous boundary data and source decays exponentially as time tends to infinity.
title Anisotropic extended Burgers model, its relaxation tensor and properties of the associated Boltzmann viscoelastic system
topic Analysis of PDEs
url https://arxiv.org/abs/2406.18978