An algorithm for the local refinement of a given triangulation consisting
of prisms is presented. In the refined triangulation there can be
some nonconforming nodes. It is shown that there exists a conforming
triangulation consisting of prisms, pyramids, and tetrahedra which
contains the nonconforming one. Proofs for the finiteness of the
algorithm and stability of the obtained triangulations are presented.
%0 Journal Article
%1 siebert1993local
%A Siebert, Kunibert G.
%D 1993
%J Impact of computing in science and engineering
%K fis ians liste
%N 4
%P 271-284
%R 10.1006/icse.1993.1012
%T Local Refinement of 3D-Meshes Consisting of Prisms and Conforming Closure
%V 5
%X An algorithm for the local refinement of a given triangulation consisting
of prisms is presented. In the refined triangulation there can be
some nonconforming nodes. It is shown that there exists a conforming
triangulation consisting of prisms, pyramids, and tetrahedra which
contains the nonconforming one. Proofs for the finiteness of the
algorithm and stability of the obtained triangulations are presented.
@article{siebert1993local,
abstract = {An algorithm for the local refinement of a given triangulation consisting
of prisms is presented. In the refined triangulation there can be
some nonconforming nodes. It is shown that there exists a conforming
triangulation consisting of prisms, pyramids, and tetrahedra which
contains the nonconforming one. Proofs for the finiteness of the
algorithm and stability of the obtained triangulations are presented.},
added-at = {2019-06-17T14:25:24.000+0200},
author = {Siebert, Kunibert G.},
biburl = {https://puma.ub.uni-stuttgart.de/bibtex/28e3251e5f54b5c8754550363e3dedd7c/britsteiner},
doi = {10.1006/icse.1993.1012},
interhash = {0a6ecc4f4b6adbd0e9d8e9ce6b83f1f7},
intrahash = {8e3251e5f54b5c8754550363e3dedd7c},
issn = {0899-8248},
journal = {Impact of computing in science and engineering},
keywords = {fis ians liste},
language = {eng},
number = 4,
pages = {271-284},
timestamp = {2019-06-17T12:34:15.000+0200},
title = {Local Refinement of 3D-Meshes Consisting of Prisms and Conforming Closure},
volume = 5,
year = 1993
}