TY - JOUR
T1 - A note about hardening-free viscoelastic models in Maxwellian-type rheologies at large strains
AU - Davoli, Elisa
AU - Roubček, Tomáš
AU - Stefanelli, Ulisse
N1 - Publisher Copyright:
© The Author(s) 2021.
PY - 2021/10
Y1 - 2021/10
N2 - Maxwellian-type rheological models of inelastic effects of creep type at large strains are revisited in relation to inelastic strain gradient theories. In particular, we observe that a dependence of the stored energy density on inelastic strain gradients may lead to spurious hardening effects, preventing the model from accommodating large inelastic slips. The main result of this paper is an alternative inelastic model of creep type, where a higher-order energy contribution is provided by the gradients of the elastic strain and of the plastic strain rate, thus preventing the onset of spurious hardening under large slips. The combination of Kelvin–Voigt damping and Maxwellian creep results in a Jeffreys-type rheological model. The existence of weak solutions is proved by way of a Faedo–Galerkin approximation.
AB - Maxwellian-type rheological models of inelastic effects of creep type at large strains are revisited in relation to inelastic strain gradient theories. In particular, we observe that a dependence of the stored energy density on inelastic strain gradients may lead to spurious hardening effects, preventing the model from accommodating large inelastic slips. The main result of this paper is an alternative inelastic model of creep type, where a higher-order energy contribution is provided by the gradients of the elastic strain and of the plastic strain rate, thus preventing the onset of spurious hardening under large slips. The combination of Kelvin–Voigt damping and Maxwellian creep results in a Jeffreys-type rheological model. The existence of weak solutions is proved by way of a Faedo–Galerkin approximation.
KW - Creep at large strains
KW - gradient of the elastic strain
KW - spurious hardening
KW - weak solutions
UR - http://www.scopus.com/inward/record.url?scp=85101083083&partnerID=8YFLogxK
U2 - 10.1177/1081286521990418
DO - 10.1177/1081286521990418
M3 - Article
AN - SCOPUS:85101083083
VL - 26
SP - 1483
EP - 1497
JO - Mathematics and Mechanics of Solids
JF - Mathematics and Mechanics of Solids
SN - 1081-2865
IS - 10
ER -