PUMA publications for /user/mhartmann/error%20estimators,%20vorlaeufighttps://puma.ub.uni-stuttgart.de/user/mhartmann/error%20estimators,%20vorlaeufigPUMA RSS feed for /user/mhartmann/error%20estimators,%20vorlaeufig2024-03-29T15:47:01+01:00- A posteriori error estimates with point sources in fractional sobolev
spaceshttps://puma.ub.uni-stuttgart.de/bibtex/2a795baaf1eb095e7f7ab84a05f884ad8/mhartmannmhartmann2018-07-20T10:54:15+02:00Dirac Sobolev a adaptivity, element error estimators, finite fractional mass, methods, posteriori spaces vorlaeufig <span data-person-type="author" class="authorEditorList "><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="F. D. Gaspoz" itemprop="url" href="/person/1fea501ed2a4ad0de2f63886c01491c60/author/0"><span itemprop="name">F. Gaspoz</span></a></span>, </span><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="P. Morin" itemprop="url" href="/person/1fea501ed2a4ad0de2f63886c01491c60/author/1"><span itemprop="name">P. Morin</span></a></span>, </span> and <span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="A. Veeser" itemprop="url" href="/person/1fea501ed2a4ad0de2f63886c01491c60/author/2"><span itemprop="name">A. Veeser</span></a></span></span>. </span><span class="additional-entrytype-information"><span itemtype="http://schema.org/PublicationIssue" itemscope="itemscope" itemprop="isPartOf"><em><span itemprop="journal">Numerical Methods for Partial Differential Equations</span>, </em> <em><span itemtype="http://schema.org/PublicationVolume" itemscope="itemscope" itemprop="isPartOf"><span itemprop="volumeNumber">33 </span></span>(<span itemprop="issueNumber">4</span>):
<span itemprop="pagination">1018--1042</span></em> </span>(<em><span>2017<meta content="2017" itemprop="datePublished"/></span></em>)</span>Fri Jul 20 10:54:15 CEST 2018Numerical Methods for Partial Differential Equations41018--1042A posteriori error estimates with point sources in fractional sobolev
spaces332017Dirac Sobolev a adaptivity, element error estimators, finite fractional mass, methods, posteriori spaces vorlaeufig
- A convergent time-space adaptive $dG(s)$ finite element method for
parabolic problems motivated by equal error distributionhttps://puma.ub.uni-stuttgart.de/bibtex/24276d5a0313937597a16f8ab9f50ce70/mhartmannmhartmann2018-07-20T10:54:15+02:00a adaptivity, convergence, element equation error estimators, finite heat methods, posteriori vorlaeufig <span data-person-type="author" class="authorEditorList "><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="F. D. Gaspoz" itemprop="url" href="/person/1590acae3fb93ecdb48f22ba922444179/author/0"><span itemprop="name">F. Gaspoz</span></a></span>, </span><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="C. Kreuzer" itemprop="url" href="/person/1590acae3fb93ecdb48f22ba922444179/author/1"><span itemprop="name">C. Kreuzer</span></a></span>, </span><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="K. Siebert" itemprop="url" href="/person/1590acae3fb93ecdb48f22ba922444179/author/2"><span itemprop="name">K. Siebert</span></a></span>, </span> and <span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="D. Ziegler" itemprop="url" href="/person/1590acae3fb93ecdb48f22ba922444179/author/3"><span itemprop="name">D. Ziegler</span></a></span></span>. </span><span class="additional-entrytype-information">(<em><span>2017<meta content="2017" itemprop="datePublished"/></span></em>)</span>Fri Jul 20 10:54:15 CEST 2018SubmittedA convergent time-space adaptive $dG(s)$ finite element method for
parabolic problems motivated by equal error distribution2017a adaptivity, convergence, element equation error estimators, finite heat methods, posteriori vorlaeufig