Standard

Basis-free expressions for families of objective strain tensors, their rates, and conjugate stress tensors. / Korobeynikov, S. N.

в: Acta Mechanica, Том 229, № 3, 01.03.2018, стр. 1061-1098.

Результаты исследований: Научные публикации в периодических изданияхстатьяРецензирование

Harvard

Korobeynikov, SN 2018, 'Basis-free expressions for families of objective strain tensors, their rates, and conjugate stress tensors', Acta Mechanica, Том. 229, № 3, стр. 1061-1098. https://doi.org/10.1007/s00707-017-1972-7

APA

Korobeynikov, S. N. (2018). Basis-free expressions for families of objective strain tensors, their rates, and conjugate stress tensors. Acta Mechanica, 229(3), 1061-1098. https://doi.org/10.1007/s00707-017-1972-7

Vancouver

Korobeynikov SN. Basis-free expressions for families of objective strain tensors, their rates, and conjugate stress tensors. Acta Mechanica. 2018 март 1;229(3):1061-1098. doi: 10.1007/s00707-017-1972-7

Author

Korobeynikov, S. N. / Basis-free expressions for families of objective strain tensors, their rates, and conjugate stress tensors. в: Acta Mechanica. 2018 ; Том 229, № 3. стр. 1061-1098.

BibTeX

@article{fa270c41514c46db8d60c3c13695f5ed,
title = "Basis-free expressions for families of objective strain tensors, their rates, and conjugate stress tensors",
abstract = "The objective (Lagrangian and Eulerian) strain tensors, their rates, and conjugate stress tensors used in continuum mechanics equations are considered. These tensors are represented in the eigenprojections of the right and left stretch tensors U and V. The novelty of the research lies in the simultaneous derivation of expressions for Lagrangian versions of tensors and their Eulerian counterparts with decomposition of the obtained expressions into components coaxial and orthogonal to the tensors U and V. We consider the Lagrangian and Eulerian Doyle–Ericksen families of strain tensors, which, in turn, are subfamilies of the well-known Hill family of strain tensors. Basis-free expressions are obtained for the material rates of Lagrangian tensors from the previously introduced family of generalized strain tensors, whose subfamilies are the Lagrangian and Eulerian Hill families of strain tensors, and similar expressions are obtained for the Green–Naghdi rates of Eulerian strain tensors, which are Eulerian counterparts of the material rates of Lagrangian strain tensors. Basis-free expressions for stress tensors are derived from the classical definitions of the conjugacy of stress and strain tensors. Expressions are found for the Lagrangian and Eulerian symmetric Atluri stress tensors that do not have conjugate strain tensors from the Hill family, and the obtained expressions are decomposed into components coaxial and orthogonal to the tensors U and V. The ranges of allowed ratios of different principal stretches at which the Lagrangian and Eulerian Hencky and Atluri stress tensors approximate the rotated/standard Kirchhoff stress tensors are determined. It is shown that the range of allowed ratios for the Hencky stress tensors is wider than that for the Atluri stress tensors.",
keywords = "53A45, 74A05, = C, SPIN TENSORS, TIME RATE, STRETCH TENSOR, CONTINUUM-MECHANICS, LOGARITHMIC STRAIN, DEFORMATION GRADIENT, DECOMPOSITION, 4TH-ORDER TENSORS, HILLS STRAIN",
author = "Korobeynikov, {S. N.}",
year = "2018",
month = mar,
day = "1",
doi = "10.1007/s00707-017-1972-7",
language = "English",
volume = "229",
pages = "1061--1098",
journal = "Acta Mechanica",
issn = "0001-5970",
publisher = "Springer-Verlag GmbH and Co. KG",
number = "3",

}

RIS

TY - JOUR

T1 - Basis-free expressions for families of objective strain tensors, their rates, and conjugate stress tensors

AU - Korobeynikov, S. N.

PY - 2018/3/1

Y1 - 2018/3/1

N2 - The objective (Lagrangian and Eulerian) strain tensors, their rates, and conjugate stress tensors used in continuum mechanics equations are considered. These tensors are represented in the eigenprojections of the right and left stretch tensors U and V. The novelty of the research lies in the simultaneous derivation of expressions for Lagrangian versions of tensors and their Eulerian counterparts with decomposition of the obtained expressions into components coaxial and orthogonal to the tensors U and V. We consider the Lagrangian and Eulerian Doyle–Ericksen families of strain tensors, which, in turn, are subfamilies of the well-known Hill family of strain tensors. Basis-free expressions are obtained for the material rates of Lagrangian tensors from the previously introduced family of generalized strain tensors, whose subfamilies are the Lagrangian and Eulerian Hill families of strain tensors, and similar expressions are obtained for the Green–Naghdi rates of Eulerian strain tensors, which are Eulerian counterparts of the material rates of Lagrangian strain tensors. Basis-free expressions for stress tensors are derived from the classical definitions of the conjugacy of stress and strain tensors. Expressions are found for the Lagrangian and Eulerian symmetric Atluri stress tensors that do not have conjugate strain tensors from the Hill family, and the obtained expressions are decomposed into components coaxial and orthogonal to the tensors U and V. The ranges of allowed ratios of different principal stretches at which the Lagrangian and Eulerian Hencky and Atluri stress tensors approximate the rotated/standard Kirchhoff stress tensors are determined. It is shown that the range of allowed ratios for the Hencky stress tensors is wider than that for the Atluri stress tensors.

AB - The objective (Lagrangian and Eulerian) strain tensors, their rates, and conjugate stress tensors used in continuum mechanics equations are considered. These tensors are represented in the eigenprojections of the right and left stretch tensors U and V. The novelty of the research lies in the simultaneous derivation of expressions for Lagrangian versions of tensors and their Eulerian counterparts with decomposition of the obtained expressions into components coaxial and orthogonal to the tensors U and V. We consider the Lagrangian and Eulerian Doyle–Ericksen families of strain tensors, which, in turn, are subfamilies of the well-known Hill family of strain tensors. Basis-free expressions are obtained for the material rates of Lagrangian tensors from the previously introduced family of generalized strain tensors, whose subfamilies are the Lagrangian and Eulerian Hill families of strain tensors, and similar expressions are obtained for the Green–Naghdi rates of Eulerian strain tensors, which are Eulerian counterparts of the material rates of Lagrangian strain tensors. Basis-free expressions for stress tensors are derived from the classical definitions of the conjugacy of stress and strain tensors. Expressions are found for the Lagrangian and Eulerian symmetric Atluri stress tensors that do not have conjugate strain tensors from the Hill family, and the obtained expressions are decomposed into components coaxial and orthogonal to the tensors U and V. The ranges of allowed ratios of different principal stretches at which the Lagrangian and Eulerian Hencky and Atluri stress tensors approximate the rotated/standard Kirchhoff stress tensors are determined. It is shown that the range of allowed ratios for the Hencky stress tensors is wider than that for the Atluri stress tensors.

KW - 53A45

KW - 74A05

KW - = C

KW - SPIN TENSORS

KW - TIME RATE

KW - STRETCH TENSOR

KW - CONTINUUM-MECHANICS

KW - LOGARITHMIC STRAIN

KW - DEFORMATION GRADIENT

KW - DECOMPOSITION

KW - 4TH-ORDER TENSORS

KW - HILLS STRAIN

UR - http://www.scopus.com/inward/record.url?scp=85030682459&partnerID=8YFLogxK

U2 - 10.1007/s00707-017-1972-7

DO - 10.1007/s00707-017-1972-7

M3 - Article

AN - SCOPUS:85030682459

VL - 229

SP - 1061

EP - 1098

JO - Acta Mechanica

JF - Acta Mechanica

SN - 0001-5970

IS - 3

ER -

ID: 9894494