http://thecostofknowledge.com/
Matthew Knepley via petsc-dev <petsc-dev@mcs.anl.gov> writes: > This sounds goofy to me. Are we interested? > > Matt > > ---------- Forwarded message --------- > From: Guillaume Ducrozet <guillaume.ducro...@ec-nantes.fr> > Date: Sat, Nov 10, 2018 at 9:39 AM > Subject: Call for papers, CAMWA special Issue on open-source PDE solvers > To: > Cc: Qingang Xiong <qingang.xi...@gm.com>, Vadym Aizinger < > aizin...@math.fau.de>, fei...@ansys.com <fei...@ansys.com> > > > Dear Respected Researchers, > > Please forgive us if you received this email multiple times. If you have > responded, please disregard this email. > > Computers & Mathematics with Applications (Elsevier, current impact factor > 1.860) will launch a special issue dedicated to open-source numerical > solvers for partial differential equations (PDEs) co-edited by Dr. Qingang > Xiong (Senior Scientist, General Motors, USA), Dr. Vadym Aizinger (Senior > Scientist, Alfred Wegener Institute for Polar and Marine Research, > Germany), Dr. Fei Xu (R&D Engineer, Ansys Inc, USA), and Dr. Guillaume > Ducrozet (Associate Professor, Ecole Centrale de Nantes, France). > > The primary purpose of this special issue is to provide an overview of the > progress in this rapidly developing area and to identify current trends and > near-term prospects in connection with the algorithm design, theoretical > development, and various areas of application of open-source software for > PDEs. Our goal is to let authors focus on the software design, algorithms, > applications and future prospects of open source PDE solvers. Articles > focusing on these topics are usually very difficult to publish in refereed > journals in either applied mathematics, or engineering, or computer > science. In addition, we attempt to facilitate better communication between > the authors and the users of such packages by providing the developers with > a forum to present their work and supplying an up-to-date list of open > source PDE solvers. > > Major numerical methods covered in this special issues include, but not > limited to, finite difference methods, finite element methods, finite > volume methods, spectral methods, meshfree/meshless methods (e.g. LBM and > SPH), gradient discretization methods, domain decomposition methods, time > discretization methods, as well as multigrid methods (in conjunction with > spatial discretization). > > The guest editors of this special issue invite authors of open-source > packages interested in having their package listed in the editorial as well > as the potential contributors to the special issue to fill out by November > 25th a short information sheet (https://goo.gl/forms/4LdrD3BCVGtMAZef1). > Please note that, required by the journal, a printed published paper must > contain at least 15 pages. The estimated manuscript submission deadline is > June 30, 2019. The guest editors encourage you to help spreading this "Call > for Papers" to your colleagues and collaborators active in this area. > > > Qingang Xiong > Vadym Aizinger > Fei Xu > Guillaume Ducrozet > > -- > [image: Logo Centrale Nantes] <http://www.ec-nantes.fr> > *Guillaume DUCROZET* > Associate Professor in Ocean Engineering > > *LHEEA Lab. - Centrale Nantes / CNRS * > > 1 rue de la Noƫ > 44321 Nantes Cedex 3 - France > > > *+ 33 (0)2 40 37 16 45 *guillaume.ducro...@ec-nantes.fr