PUMA publications for /user/hermann/equation;%20%7Bstochastichttps://puma.ub.uni-stuttgart.de/user/hermann/equation;%20%7BstochasticPUMA RSS feed for /user/hermann/equation;%20%7Bstochastic2024-03-19T05:30:24+01:00- UNCERTAINTY QUANTIFICATION FOR HYPERBOLIC CONSERVATION LAWS WITH FLUX
COEFFICIENTS GIVEN BY SPATIOTEMPORAL RANDOM FIELDShttps://puma.ub.uni-stuttgart.de/bibtex/2ca15e451be40b14c5bec014bafe54360/hermannhermann2017-05-18T11:32:12+02:00Carlo Gaussian Monte Ornstein-Uhlenbeck differential equation; field; field} finite flux function; hyperbolic method; partial process; quantification; random spatiotemporal uncertainty volume {stochastic <span data-person-type="author" class="authorEditorList "><span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="Andrea Barth" itemprop="url" href="/person/1b1b958721ff8d51a5d30f7154c6f3414/author/0"><span itemprop="name">A. Barth</span></a></span>, </span> and <span><span itemtype="http://schema.org/Person" itemscope="itemscope" itemprop="author"><a title="Franz G. Fuchs" itemprop="url" href="/person/1b1b958721ff8d51a5d30f7154c6f3414/author/1"><span itemprop="name">F. Fuchs</span></a></span></span>. </span><span class="additional-entrytype-information"><span itemtype="http://schema.org/PublicationIssue" itemscope="itemscope" itemprop="isPartOf"><em><span itemprop="journal">SIAM JOURNAL ON SCIENTIFIC COMPUTING</span>, </em> <em><span itemtype="http://schema.org/PublicationVolume" itemscope="itemscope" itemprop="isPartOf"><span itemprop="volumeNumber">38 </span></span>(<span itemprop="issueNumber">4</span>):
<span itemprop="pagination">A2209-A2231</span></em> </span>(<em><span>2016<meta content="2016" itemprop="datePublished"/></span></em>)</span>