Your browser does not allow JavaScript!
JavaScript is necessary for the proper functioning of this website. Please enable JavaScript or use a modern browser.
Open Science Slovenia
Open Science
DiKUL
slv
|
eng
Search
Browse
New in RUL
About RUL
In numbers
Help
Sign in
A kinematically exact finite element formulation of planar elastic - plastic frames
ID
Saje, Miran
(
Author
),
ID
Planinc, Igor
(
Author
),
ID
Turk, Goran
(
Author
),
ID
Vratanar, Blaž
(
Author
)
PDF - Presentation file,
Download
(407,98 KB)
MD5: 842E8AD3A644E9FF695DBE9823D59340
PID:
20.500.12556/rul/f79e92be-d784-443a-951d-5f44d61009db
Image galllery
Abstract
A finite element formulation of finite deformation static analysis of plane elastic-plastic frames subjected to static loads is presented, in which the only function to be interpolated is the rotation of the centroid axis of the beam. One of the advantages of such a formulation is that the problem of the field-consistency does not arise. Exact non-linear kinematic relationships of the finite-strain beam theory are used, which assume the Bernoulli hypothesis of plane cross-sections. Finite displacements and rotations as well as finite extensional and bending strains are accounted for. The effects of shear strains and non-conservative loads are at present neglected, yet they can simply be incorporated in the formulation. Because the potential energy of internal forces does not exist with elastic-plastic material, the principle of virtual work is introduced as the basis of the finite element formulation. A generalized principle of virtual work is proposed in which the displacements, rotation, extensional and bending strains, and the Lagrangian multipliers are independent variables. By exploiting the special structure of the equations of the problem, the displacements, the strains and the multipliers are eliminated from the generalized principle of virtual work. A novel principle is obtained in which the rotation becomes the only function to be approximated in its finite element implementation. It is shown that (N-1)-point numerical integration must be employed in conjunction with N-node interpolation polynomials for the rotation, and the Lobatto rule is recommended. Regarding the integration over the cross-section, it is demonstrated by numerical examples that, due to discontinuous integrands, no integration order defined as `computationally efficient yet accurate enough' could be suggested. The theoretical findings and a nice performance of the derived finite elements are illustrated by numerical examples.
Language:
English
Keywords:
plane frame
,
exact kinematics
,
plasticity
,
generalized principle of virtual work
,
finite elements
Typology:
1.01 - Original Scientific Article
Organization:
FGG - Faculty of Civil and Geodetic Engineering
Publisher:
Elsevier
Year:
1997
Number of pages:
Str. 125-151
Numbering:
Vol. 144, no. 1/2
PID:
20.500.12556/RUL-32127
UDC:
519.61/.64:531.1:539.374
ISSN on article:
0045-7825
DOI:
10.1016/S0045-7825(96)01172-3
COBISS.SI-ID:
163169
Publication date in RUL:
10.07.2015
Views:
4768
Downloads:
1101
Metadata:
Cite this work
Plain text
BibTeX
EndNote XML
EndNote/Refer
RIS
ABNT
ACM Ref
AMA
APA
Chicago 17th Author-Date
Harvard
IEEE
ISO 690
MLA
Vancouver
:
Copy citation
Share:
Record is a part of a journal
Title:
Computer methods in applied mechanics and engineering
Shortened title:
Comput. methods appl. mech. eng.
Publisher:
Elsevier
ISSN:
0045-7825
COBISS.SI-ID:
6695685
Secondary language
Language:
English
Keywords:
ravninski okvir
,
točna kinematika
,
posplošeni princip virtualnega dela
,
plastičnost
,
končni elementi
Similar documents
Similar works from RUL:
Similar works from other Slovenian collections:
Back