PUMA publications for /user/mathematik/poroushttps://puma.ub.uni-stuttgart.de/user/mathematik/porousPUMA RSS feed for /user/mathematik/porous2024-03-29T14:38:57+01:00- A finite-volume moving-mesh method for two-phase flow in
fracturing porous mediahttps://puma.ub.uni-stuttgart.de/bibtex/208be7563b587190c24a78304dab29287/mathematikmathematik2022-02-23T10:11:48+01:00Discrete Dynamic Finite Fracture Moving-mesh Two-phase algorithm am aperture flow fracture from:brittalenz ians in matrix media methods models porous propagation volume <span data-person-type="author" class="authorEditorList "><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="Samuel Burbulla" itemprop="url" href="/person/11ef19dc47df248ebcee76f8655d00172/author/0"><span itemprop="name">S. Burbulla</span></a></span>, </span> and <span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="Christian Rohde" itemprop="url" href="/person/11ef19dc47df248ebcee76f8655d00172/author/1"><span itemprop="name">C. Rohde</span></a></span></span>. </span><span class="additional-entrytype-information"><span itemtype="http://schema.org/PublicationIssue" itemscope="itemscope" itemprop="isPartOf"><em><span itemprop="journal">J. Comput. Phys.</span>, </em> </span>(<em><span>2022<meta content="2022" itemprop="datePublished"/></span></em>)</span>
- Reduced basis approximation and a-posteriori error estimation for the coupled Stokes-Darcy systemhttps://puma.ub.uni-stuttgart.de/bibtex/2a83ef7da936322ea35f09a4d03bb61bd/mathematikmathematik2021-09-29T14:35:08+02:00Error decomposition; medium 76D07 from:britsteiner Porous Reduced ians method; basis problem; Stokes 76S05; estimation; equation; Domain Non-coercive flow; anm 65N55; <span data-person-type="author" class="authorEditorList "><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="I. Martini" itemprop="url" href="/person/11474e2e0db6128c1ec02771a5ff8841b/author/0"><span itemprop="name">I. Martini</span></a></span>, </span><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="G. Rozza" itemprop="url" href="/person/11474e2e0db6128c1ec02771a5ff8841b/author/1"><span itemprop="name">G. Rozza</span></a></span>, </span> and <span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="Bernard Haasdonk" itemprop="url" href="/person/11474e2e0db6128c1ec02771a5ff8841b/author/2"><span itemprop="name">B. Haasdonk</span></a></span></span>. </span><span class="additional-entrytype-information"><span itemtype="http://schema.org/PublicationIssue" itemscope="itemscope" itemprop="isPartOf"><em><span itemprop="journal">Advances in Computational Mathematics</span>, </em> <em><span itemtype="http://schema.org/PublicationVolume" itemscope="itemscope" itemprop="isPartOf"><span itemprop="volumeNumber">41 </span></span>(<span itemprop="issueNumber">5</span>):
<span itemprop="pagination">1131--1157</span></em> </span>(<em><span>2015<meta content="2015" itemprop="datePublished"/></span></em>)</span>
- Stochastic Modeling for Heterogeneous Two-Phase Flowhttps://puma.ub.uni-stuttgart.de/bibtex/23886d742461971b380dfbfdfbab7f0bc/mathematikmathematik2018-07-20T10:55:08+02:00Flow Galerkin Hybrid finite from:mhartmann ians in media; method porous stochastic volume vorlaeufig <span data-person-type="author" class="authorEditorList "><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="M. Köppel" itemprop="url" href="/person/19edc4b7e189ef751cf0e8c97b22240ef/author/0"><span itemprop="name">M. Köppel</span></a></span>, </span><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="I. Kröker" itemprop="url" href="/person/19edc4b7e189ef751cf0e8c97b22240ef/author/1"><span itemprop="name">I. Kröker</span></a></span>, </span> and <span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="C. Rohde" itemprop="url" href="/person/19edc4b7e189ef751cf0e8c97b22240ef/author/2"><span itemprop="name">C. Rohde</span></a></span></span>. </span><span class="additional-entrytype-information"><span itemtype="http://schema.org/Book" itemscope="itemscope" itemprop="isPartOf"><em><span itemprop="name">Finite Volumes for Complex Applications VII-Methods and Theoretical
Aspects</span>, </em><em>volume 77 of Springer Proceedings in Mathematics & Statistics, </em><em><span itemprop="publisher">Springer International Publishing</span>, </em></span>(<em><span>2014<meta content="2014" itemprop="datePublished"/></span></em>)</span>
- Reduced basis approximation and a-posteriori error estimation for
the coupled Stokes-Darcy systemhttps://puma.ub.uni-stuttgart.de/bibtex/2cc6b799a8d34f87ec3cd593a8053b3ae/mathematikmathematik2018-07-20T10:54:42+02:0065N55; 76D07 76S05; Domain Error Non-coercive Porous Reduced Stokes basis decomposition; equation; estimation; flow; from:mhartmann ians medium method; problem; vorlaeufig <span data-person-type="author" class="authorEditorList "><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="I. Martini" itemprop="url" href="/person/11474e2e0db6128c1ec02771a5ff8841b/author/0"><span itemprop="name">I. Martini</span></a></span>, </span><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="G. Rozza" itemprop="url" href="/person/11474e2e0db6128c1ec02771a5ff8841b/author/1"><span itemprop="name">G. Rozza</span></a></span>, </span> and <span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="B. Haasdonk" itemprop="url" href="/person/11474e2e0db6128c1ec02771a5ff8841b/author/2"><span itemprop="name">B. Haasdonk</span></a></span></span>. </span><span class="additional-entrytype-information"><span itemtype="http://schema.org/PublicationIssue" itemscope="itemscope" itemprop="isPartOf"><em><span itemprop="journal">Advances in Computational Mathematics</span>, </em> <em><span itemtype="http://schema.org/PublicationVolume" itemscope="itemscope" itemprop="isPartOf"><span itemprop="volumeNumber">41 </span></span>(<span itemprop="issueNumber">5</span>):
<span itemprop="pagination">1131--1157</span></em> </span>(<em><span>2015<meta content="2015" itemprop="datePublished"/></span></em>)</span>
- On the singular limit of a two-phase flow equation with heterogeneities
and dynamic capillary pressurehttps://puma.ub.uni-stuttgart.de/bibtex/242d1b78569ecd89f80f0f48af825ce75/mathematikmathematik2018-07-20T10:54:26+02:00Conservation capillarity, discontinuous dynamic flow flux from:mhartmann function, ians in law, limit, media. porous singular two-phase vorlaeufig <span data-person-type="author" class="authorEditorList "><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="F. Kissling" itemprop="url" href="/person/1dfd390454fe4506ee81abb066cb2a4d4/author/0"><span itemprop="name">F. Kissling</span></a></span>, </span> and <span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="K.H. Karlsen" itemprop="url" href="/person/1dfd390454fe4506ee81abb066cb2a4d4/author/1"><span itemprop="name">K. Karlsen</span></a></span></span>. </span><span class="additional-entrytype-information"><span itemtype="http://schema.org/PublicationIssue" itemscope="itemscope" itemprop="isPartOf"><em><span itemprop="journal">ZAMM - Journal of Applied Mathematics and Mechanics / Zeitschrift
für Angewandte Mathematik und Mechanik</span>, </em> </span>(<em><span>2013<meta content="2013" itemprop="datePublished"/></span></em>)</span>