Analytical, Numerical and Integrable systems approaches for nonlinear dispersive PDEs

View Statistics Email Alert RSS Feed

Primary Data

Project Acronym Projekt Kurzbezeichnung
DispersPDE
 
Project Title (de) Projekttitel (de)
Analytical, Numerical and Integrable systems approaches for nonlinear dispersive PDEs
 
Project Title (en) Projekttitel (en)
Analytical, Numerical and Integrable systems approaches for nonlinear dispersive PDEs
 
Consortium Coordinator Koordinator des Konsortiums
 
Principal Investigator Projektleiter_in
 

Grants

Funder/Funding Agency Fördergeber
FWF - Österr. Wissenschaftsfonds
Grant number Förderkennnummer
I 3538-N32
 

Publications

Results 1-4 of 4 (Search time: 0.002 seconds).

PreviewAuthor(s)TitleTypeIssue Date
1Arnold-2025-Advances in Computational Mathematics-vor.pdf.jpgArnold, Anton ; Körner, Jannis WKB-based third order method for the highly oscillatory 1D stationary Schrödinger equationArticle Artikel 2025
2Arnold, Anton ; Geevers, Sjoerd ; Perugia, Ilaria ; Ponomarev, Dmitry On the exponential time-decay for the one-dimensional wave equation with variable coefficientsArticle Artikel Oct-2022
3Ponomarev-2022-AppliedMath-vor.pdf.jpgPonomarev, Dmitry A Note on the Appearance of the Simplest Antilinear ODE in Several Physical ContextsArticle Artikel 29-Jul-2022
4Arnold, Anton ; Geevers, Sjoerd ; Perugia, Ilaria ; Ponomarev, Dmitry An adaptive finite element method for high-frequency scattering problems with smoothly varying coefficientsArticle Artikel 1-Mar-2022