A re-formulation of extended subloading surface model for cyclic plasticity within small strain framework: hyperelastic-based formulation and fully implicit return-mapping scheme

Iguchi, Takuya; Yamakawa, Yuki; Ikeda, Kiyohiro

doi:10.1299/transjsme.16-00197

Cited by 2 publications

(1 citation statement)

References 29 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…was used by Hashiguchi [30], Hashiguchi and Ueno [39], Iguchi et al [45][46][47], etc., wherê n c of ðc; bÞ oc 0 of ðc; bÞ oc ð26Þ which is the normalized outward-normal of the elastic-core surface at the current elastic-core c. It cannot be applicable to the generic deformation behavior, since it depends only on the unit outward-normal tensors n andn c independent of the size and the shape of the normal-yield surface as seen in the right-hand side of Eq. ( 25).…”

Section: Evolution Rule Of Elastic-corementioning

confidence: 99%

Elaborated subloading surface model for accurate description of cyclic mobility in granular materials

Hashiguchi¹,

Mase

Yamakawa

2021

Acta Geotech.

Self Cite

View full text Add to dashboard Cite

The description of the cyclic mobility observed prior to the liquefaction in geomaterials requires the sophisticated constitutive formulation to describe the plastic deformation induced during the cyclic loading with the small stress amplitude inside the yield surface. This requirement is realized in the subloading surface model, in which the surface enclosing a purely elastic domain is not assumed, while a purely elastic domain is assumed in other elastoplasticity models. The subloading surface model has been applied widely to the monotonic/cyclic loading behaviors of metals, soils, rocks, concrete, etc., and the sufficient predictions have been attained to some extent. The subloading surface model will be elaborated so as to predict also the cyclic mobility accurately in this article. First, the rigorous translation rule of the similarity center of the normal yield and the subloading surfaces, i.e., elastic core, is formulated. Further, the mixed hardening rule in terms of volumetric and deviatoric plastic strain rates and the rotational hardening rule are formulated to describe the induced anisotropy of granular materials. In addition, the material functions for the elastic modulus, the yield function and the isotropic hardening/softening will be modified for the accurate description of the cyclic mobility. Then, the validity of the present formulation will be verified through comparisons with various test data of cyclic mobility.

show abstract

Section: Evolution Rule Of Elastic-corementioning

confidence: 99%

Elaborated subloading surface model for accurate description of cyclic mobility in granular materials

Hashiguchi¹,

Mase

Yamakawa

2021

Acta Geotech.

Self Cite

View full text Add to dashboard Cite

show abstract

Extended subloading surface model based on multiplicative finite strain elastoplasticity framework: constitutive formulation and fully implicit return-mapping scheme

Iguchi

Yamakawa

Hashiguchi

et al. 2017

Transactions of the JSME (In Japanese)

View full text Add to dashboard Cite

This paper presents a finite strain elastoplastic constitutive model incorporating the extended subloading surface concept within the unconventional plasticity framework for cyclic loadings. This is a reformulated and extended version of the small strain model [Iguchi et al., Trans. JSME (in Japanese), Vol. 82 (2016), No. 841 p. 16-00197]. The constitutive formulation is underpinned by the multiplicative decomposition of the deformation gradient tensor, which is the wellestablished modern kinematical framework in geometrically nonlinear elastoplasticity. In addition to the conventional multiplicative decomposition into elastic and plastic parts, we further introduce two kinds of multiplicative decompositions of the plastic deformation gradient tensor. One decomposition is related to kinematic hardening, and the other an evolution of the elastic-core tensor, i.e. a key internal variable in the extended subloading surface model, which stands for a stress state where the material exhibits most elastic responses. In each decomposition, the plastic deformation gradient tensor is split into an energetic part and a dissipative part, and the former is related to the back-stress tensor for kinematic hardening or the elastic-core tensor defined on a pertinent intermediate configuration via a hyperelastic format. Therefore, the whole constitutive theory can be formulated in terms of deformation-like tensorial variables without resort to any objective or co-rotational rates of stress-like variables such as the back-stress, fulfilling the principle of material frame indifference. We then focus on the numerical stress update scheme for the proposed material model based on the fully implicit return-mapping. Basic properties of the proposed model, as well as the capability of the developed numerical scheme, are examined and verified through numerical examples.

show abstract

A re-formulation of extended subloading surface model for cyclic plasticity within small strain framework: hyperelastic-based formulation and fully implicit return-mapping scheme

Cited by 2 publications

References 29 publications

Elaborated subloading surface model for accurate description of cyclic mobility in granular materials

Elaborated subloading surface model for accurate description of cyclic mobility in granular materials

Extended subloading surface model based on multiplicative finite strain elastoplasticity framework: constitutive formulation and fully implicit return-mapping scheme

Contact Info

Product

Resources

About