On triangular virtual elements for Kirchhoff–Love shells

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Autoren

Organisationseinheiten

Externe Organisationen

  • Universidade de Sao Paulo
Forschungs-netzwerk anzeigen

Details

OriginalspracheEnglisch
Seiten (von - bis)2371-2404
Seitenumfang34
FachzeitschriftArchive of applied mechanics
Jahrgang94
Ausgabenummer9
Frühes Online-Datum26 Apr. 2024
PublikationsstatusVeröffentlicht - Sept. 2024

Abstract

We develop low-order triangular virtual elements for linear Kirchhoff–Love shells from an engineering point of view. Flat element geometry is considered, which enables a direct shell discretization with no need for a curvilinear coordinate system or predefined initial mapping. Along with the assumed linearity of the problem, the superposition of the uncoupled membrane and plate energies is performed by unifying aspects of the virtual element method when applied to linear two-dimensional elasticity and plate bending problems. We explore low-order cases, namely linear to quadratic membrane displacements and quadratic to cubic deflection polynomial approximations such that no internal degrees of freedom are needed. For all elements, a single stabilization available in the literature is employed to stabilize the element formulations. Numerical examples of static problems show that the presented formulation is capable of solving complex shell problems. Possible extensions are discussed in future works.

ASJC Scopus Sachgebiete

Zitieren

On triangular virtual elements for Kirchhoff–Love shells. / Wu, T. P.; Pimenta, P. M.; Wriggers, P.
in: Archive of applied mechanics, Jahrgang 94, Nr. 9, 09.2024, S. 2371-2404.

Publikation: Beitrag in FachzeitschriftArtikelForschungPeer-Review

Wu TP, Pimenta PM, Wriggers P. On triangular virtual elements for Kirchhoff–Love shells. Archive of applied mechanics. 2024 Sep;94(9):2371-2404. Epub 2024 Apr 26. doi: 10.1007/s00419-024-02591-9
Wu, T. P. ; Pimenta, P. M. ; Wriggers, P. / On triangular virtual elements for Kirchhoff–Love shells. in: Archive of applied mechanics. 2024 ; Jahrgang 94, Nr. 9. S. 2371-2404.
Download
@article{53eea15640c142f88229400024b6731b,
title = "On triangular virtual elements for Kirchhoff–Love shells",
abstract = "We develop low-order triangular virtual elements for linear Kirchhoff–Love shells from an engineering point of view. Flat element geometry is considered, which enables a direct shell discretization with no need for a curvilinear coordinate system or predefined initial mapping. Along with the assumed linearity of the problem, the superposition of the uncoupled membrane and plate energies is performed by unifying aspects of the virtual element method when applied to linear two-dimensional elasticity and plate bending problems. We explore low-order cases, namely linear to quadratic membrane displacements and quadratic to cubic deflection polynomial approximations such that no internal degrees of freedom are needed. For all elements, a single stabilization available in the literature is employed to stabilize the element formulations. Numerical examples of static problems show that the presented formulation is capable of solving complex shell problems. Possible extensions are discussed in future works.",
keywords = "Elasticity, Kirchhoff–Love, Linearity, Shells, Virtual element method",
author = "Wu, {T. P.} and Pimenta, {P. M.} and P. Wriggers",
note = "Publisher Copyright: {\textcopyright} The Author(s), under exclusive licence to Springer-Verlag GmbH Germany, part of Springer Nature 2024.",
year = "2024",
month = sep,
doi = "10.1007/s00419-024-02591-9",
language = "English",
volume = "94",
pages = "2371--2404",
journal = "Archive of applied mechanics",
issn = "0939-1533",
publisher = "Springer Verlag",
number = "9",

}

Download

TY - JOUR

T1 - On triangular virtual elements for Kirchhoff–Love shells

AU - Wu, T. P.

AU - Pimenta, P. M.

AU - Wriggers, P.

N1 - Publisher Copyright: © The Author(s), under exclusive licence to Springer-Verlag GmbH Germany, part of Springer Nature 2024.

PY - 2024/9

Y1 - 2024/9

N2 - We develop low-order triangular virtual elements for linear Kirchhoff–Love shells from an engineering point of view. Flat element geometry is considered, which enables a direct shell discretization with no need for a curvilinear coordinate system or predefined initial mapping. Along with the assumed linearity of the problem, the superposition of the uncoupled membrane and plate energies is performed by unifying aspects of the virtual element method when applied to linear two-dimensional elasticity and plate bending problems. We explore low-order cases, namely linear to quadratic membrane displacements and quadratic to cubic deflection polynomial approximations such that no internal degrees of freedom are needed. For all elements, a single stabilization available in the literature is employed to stabilize the element formulations. Numerical examples of static problems show that the presented formulation is capable of solving complex shell problems. Possible extensions are discussed in future works.

AB - We develop low-order triangular virtual elements for linear Kirchhoff–Love shells from an engineering point of view. Flat element geometry is considered, which enables a direct shell discretization with no need for a curvilinear coordinate system or predefined initial mapping. Along with the assumed linearity of the problem, the superposition of the uncoupled membrane and plate energies is performed by unifying aspects of the virtual element method when applied to linear two-dimensional elasticity and plate bending problems. We explore low-order cases, namely linear to quadratic membrane displacements and quadratic to cubic deflection polynomial approximations such that no internal degrees of freedom are needed. For all elements, a single stabilization available in the literature is employed to stabilize the element formulations. Numerical examples of static problems show that the presented formulation is capable of solving complex shell problems. Possible extensions are discussed in future works.

KW - Elasticity

KW - Kirchhoff–Love

KW - Linearity

KW - Shells

KW - Virtual element method

UR - http://www.scopus.com/inward/record.url?scp=85191751734&partnerID=8YFLogxK

U2 - 10.1007/s00419-024-02591-9

DO - 10.1007/s00419-024-02591-9

M3 - Article

AN - SCOPUS:85191751734

VL - 94

SP - 2371

EP - 2404

JO - Archive of applied mechanics

JF - Archive of applied mechanics

SN - 0939-1533

IS - 9

ER -

Von denselben Autoren