On the spectral analysis of residual stress in finite elasticity
Author
dc.contributor.author
Shariff, M. H. B. M.
Author
dc.contributor.author
Bustamante Plaza, Roger
Author
dc.contributor.author
Merodio, J.
Admission date
dc.date.accessioned
2018-05-23T16:33:44Z
Available date
dc.date.available
2018-05-23T16:33:44Z
Publication date
dc.date.issued
2017
Cita de ítem
dc.identifier.citation
IMA Journal of Applied Mathematics (2017) 82, 656–680
es_ES
Identifier
dc.identifier.other
10.1093/imamat/hxx007
Identifier
dc.identifier.uri
https://repositorio.uchile.cl/handle/2250/148075
Abstract
dc.description.abstract
In the literature, residual stress problems are generally formulated using classical invariants despite most of them having an unclear physical meaning and not having experimental advantages. In this article, we give an alternative formulation for residual stress problems using a set of spectral invariants. These invariants have a clear physical meaning which may facilitate the design of a residual stress experiment. For the case of an energy function that depends on the right Cauchy tensor and the residual stress tensor, we show that only nine of the classical invariants are independent, not 10 as commonly assumed. Details of the spectral formulation are given and several boundary value problems are illustrated.