Polynomial representation of hybrid finite elements
Abstract
We introduce the hybrid-Trefftz FE formulations for linear statics of solids as well as for linear (slow velocity) steady fluid dynamics. Moving least square procedure is given to obtain continuous secondary fields (such as stresses for solids), which improves the results. For nonlinear problems the governing equations are satisfied in the discrete least square residual form. Also for such problems the hybrid FE formulation is shown.
Keywords
References
[1] V. Kompiš, M. Kaukič, M. Žmindak. Modelling of local effects by hybrid-displacement FE. Jour. Comput. Appl. Math., 63: 265- 269, 1995.[2] V. Kompiš. Boundary Integral Equation Method for the Solution of Plane Elasticity Problems (in German). Diss. , RWTH Aachen, 1970.
[3] V.I. Blokh. Elasticity Theory (in Russian). Edition of Kharkov Univ., Kharkov, 1964,
[4] J. Jirousek. Basis for development of large elements locally satisfying all field equations. Compo Meth. Appl. Mech. Eng., 14: 65- 92, 1978.
[5] V. Kompiš. Finite elements satisfying all governing equations inside the element. Compo fj Struct., 50: 273- 278, 1994.
Published
Jun 19, 2023
How to Cite
KOMPIŠ, Vladimír; FRAŠTIA, Lubor.
Polynomial representation of hybrid finite elements.
Computer Assisted Methods in Engineering and Science, [S.l.], v. 4, n. 3-4, p. 521-532, june 2023.
ISSN 2956-5839.
Available at: <https://cames.ippt.gov.pl/index.php/cames/article/view/1387>. Date accessed: 13 nov. 2024.
Issue
Section
Articles
This work is licensed under a Creative Commons Attribution 4.0 International License.