Finite-element methods and multi-field applications

http://dx.doi.org/10.1017/S0004972720000416

Bibliographic Details
Main Author:	Ilyas, M.
Format:	Article in Journal/Newspaper
Language:	unknown
Published:	AMPAI and CUP 2020
Subjects:	Partial differential equations Finite element method MATLAB Poisson problem Nitsche penalty method gradient recovery method dual mixed formulation for Poisson problem elasticity problem sixth order problem ice shelf vibration problem 65N30 65N15 Ice Shelf
Online Access:	https://journal.austms.org.au/ojs/index.php/Bulletin/article/view/15152

id	ftaustralianmsoj:oai:journal.austms.org.au:article/15152
record_format	openpolar
spelling	ftaustralianmsoj:oai:journal.austms.org.au:article/15152 2023-05-15T16:41:51+02:00 Finite-element methods and multi-field applications Ilyas, M. 2020-07-23 https://journal.austms.org.au/ojs/index.php/Bulletin/article/view/15152 unknown AMPAI and CUP https://journal.austms.org.au/ojs/index.php/Bulletin/article/view/15152 Copyright (c) 2020 AMPAI Bulletin of the Australian Mathematical Society; Vol. 102 No. 1 (2020) 0004-9727 Partial differential equations Finite element method MATLAB Poisson problem Nitsche penalty method gradient recovery method dual mixed formulation for Poisson problem elasticity problem sixth order problem ice shelf vibration problem 65N30 65N15 info:eu-repo/semantics/article info:eu-repo/semantics/publishedVersion Abstracts of PhD Theses 2020 ftaustralianmsoj 2022-02-28T12:03:06Z http://dx.doi.org/10.1017/S0004972720000416 Article in Journal/Newspaper Ice Shelf Australian Mathematical Society (AustMS): E-Journals
institution	Open Polar
collection	Australian Mathematical Society (AustMS): E-Journals
op_collection_id	ftaustralianmsoj
language	unknown
topic	Partial differential equations Finite element method MATLAB Poisson problem Nitsche penalty method gradient recovery method dual mixed formulation for Poisson problem elasticity problem sixth order problem ice shelf vibration problem 65N30 65N15
spellingShingle	Partial differential equations Finite element method MATLAB Poisson problem Nitsche penalty method gradient recovery method dual mixed formulation for Poisson problem elasticity problem sixth order problem ice shelf vibration problem 65N30 65N15 Ilyas, M. Finite-element methods and multi-field applications
topic_facet	Partial differential equations Finite element method MATLAB Poisson problem Nitsche penalty method gradient recovery method dual mixed formulation for Poisson problem elasticity problem sixth order problem ice shelf vibration problem 65N30 65N15
description	http://dx.doi.org/10.1017/S0004972720000416
format	Article in Journal/Newspaper
author	Ilyas, M.
author_facet	Ilyas, M.
author_sort	Ilyas, M.
title	Finite-element methods and multi-field applications
title_short	Finite-element methods and multi-field applications
title_full	Finite-element methods and multi-field applications
title_fullStr	Finite-element methods and multi-field applications
title_full_unstemmed	Finite-element methods and multi-field applications
title_sort	finite-element methods and multi-field applications
publisher	AMPAI and CUP
publishDate	2020
url	https://journal.austms.org.au/ojs/index.php/Bulletin/article/view/15152
genre	Ice Shelf
genre_facet	Ice Shelf
op_source	Bulletin of the Australian Mathematical Society; Vol. 102 No. 1 (2020) 0004-9727
op_relation	https://journal.austms.org.au/ojs/index.php/Bulletin/article/view/15152
op_rights	Copyright (c) 2020 AMPAI
_version_	1766032316369469440

Finite-element methods and multi-field applications

Similar Items