On weak regularity requirements of the relaxation modulus in viscoelasticity

Sandra Carillo; Michel Chipot; Vanda Valente; Giorgio Vergara Caffarelli

doi:10.2478/caim-2019-0014

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On weak regularity requirements of the relaxation modulus in viscoelasticity

Communications in Applied and Industrial Mathematics

Volume 10 (2019): Issue 1 (February 2019)

By: Sandra Carillo, Michel Chipot, Vanda Valente and Giorgio Vergara Caffarelli

Open Access

|May 2019

Abstract

The existence and uniqueness of solution to a one-dimensional hyperbolic integro-differential problem arising in viscoelasticity is here considered. The kernel, in the linear viscoelasticity equation, represents the relaxation function which is characteristic of the considered material. Specifically, the case of a kernel, which does not satisfy the classical regularity requirements is analysed. This choice is suggested by applications according to the literature to model a wider variety of materials. A notable example of kernel, not satisfying the classical regularity requirements, is represented by a wedge continuous function. Indeed, the linear integro-differential viscoelasticity equation, characterised by a suitable wedge continuous relaxation function, is shown to give the classical linear wave equation via a limit procedure.

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Articles in this issue

DOI: https://doi.org/10.2478/caim-2019-0014 | Journal eISSN: 2038-0909

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Language: English

Page range: 78 - 87

Submitted on: Nov 16, 2018

Accepted on: Apr 24, 2019

Published on: May 11, 2019

Published by: Italian Society for Applied and Industrial Mathemathics

In partnership with: Paradigm Publishing Services

Publication frequency: 1 issue per year

Keywords:

Materials with memory,

Viscoelasticity,

hyperbolic integro-differential problem,

Regular kernel integro-differential systems,

Singular kernel integro-differential systems

Related subjects:

Mathematics,

Numerical and computational mathematics,

Applied mathematics

© 2019 Sandra Carillo, Michel Chipot, Vanda Valente, Giorgio Vergara Caffarelli, published by Italian Society for Applied and Industrial Mathemathics
This work is licensed under the Creative Commons Attribution-NonCommercial-NoDerivatives 4.0 License.

Volume 10 (2019): Issue 1 (February 2019)