Adaptive Splitting for Nonlinear Schrödinger Equations

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Primary Data

Project Acronym Projekt Kurzbezeichnung
AdapSplit
 
Project Title (de) Projekttitel (de)
Adaptive Splitting for Nonlinear Schrödinger Equations
 
Project Title (en) Projekttitel (en)
Adaptive Splitting for Nonlinear Schrödinger Equations
 
Consortium Coordinator Koordinator des Konsortiums
 
Principal Investigator Projektleiter_in
 

Grants

Funder/Funding Agency Fördergeber
FWF Fonds zur Förderung der wissenschaftlichen Forschung (FWF)
Grant number Förderkennnummer
P24157-N13
 

Publications

Results 1-20 of 41 (Search time: 0.002 seconds).

PreviewAuthor(s)TitleTypeIssue Date
1Auzinger, Winfried ; Kassebacher, Thomas ; Koch, Othmar ; Thalhammer, Mechthild Convergence of a Strang splitting finite element discretization for the Schrödinger-Poisson equationArtikel Article 2017
2Auzinger, Winfried Construction of adaptive splitting methodsPräsentation Presentation2016
3Auzinger, Winfried ; Kassebacher, Thomas ; Koch, Othmar ; Thalhammer, Mechthild Adaptive splitting methods for nonlinear Schrödinger equations in the semiclassical regimeArtikel Article 2016
4Auzinger, Winfried ; Hofstätter, Harald ; Koch, Othmar Symbolic manipulation of flows of nonlinear evolution equations, with application in the analysis of split-step time integratorsKonferenzbeitrag Inproceedings 2016
5Auzinger, Winfried ; Herfort, Wolfgang ; Hofstätter, Harald ; Koch, Othmar Setup of order conditions for splitting methodsKonferenzbeitrag Inproceedings2016
6Auzinger, Winfried ; Hofstätter, Harald ; Ketcheson, David ; Koch, Othmar ; Thalhammer, Mechthild Higher-order time-adaptive splitting schemes for evolution equationsPräsentation Presentation2016
7Auzinger, Winfried ; Koch, Othmar ; Kassebacher, Thomas ; Thalhammer, Mechthild Time-splitting FEM discretization of the Schrödinger-Poisson equationPräsentation Presentation2016
8Auzinger, Winfried ; Hofstätter, Harald ; Ketcheson, David ; Koch, Othmar ; Thalhammer, Mechthild Local error estimation and adaptive splitting in timePräsentation Presentation2016
9Auzinger, Winfried ; Hofstätter, Harald ; Koch, Othmar ; Thalhammer, Mechthild Defect-based local error estimators for splitting methods, with application to Schrödinger equations, Part III. The nonlinear caseArtikel Article 1-Jan-2015
10Auzinger, Winfried Splitting methods for evolution equations, local error estimation, and adaptivityPräsentation Presentation2015
11Auzinger, Winfried ; Kassebacher, Thomas ; Koch, Othmar ; Thalhammer, Mechthild Adaptive time-splitting methods for nonlinear Schrödinger equations in the semiclassical regimePräsentation Presentation2015
12Auzinger, Winfried Approximating the local error of one-step methods for nonlinear evolution equationsPräsentation Presentation2015
13Auzinger, Winfried ; Koch, Othmar ; Quell, Michael Splittingverfahren für die Gray-Scott-GleichungBericht Report2015
14Auzinger, Winfried ; Koch, Othmar ; Thalhammer, Mechthild Representation of the local error for higher-order exponential splitting schemes involving two or three sub-operatorsKonferenzbeitrag Inproceedings2015
15Auzinger, Winfried ; Koch, Othmar ; Thalhammer, Mechthild Defect-based local error estimators for high-order splitting methods involving three linear operatorsArtikel Article 2015
16Auzinger, Winfried ; Hofstätter, Harald ; Ketcheson, David ; Koch, Othmar Splitting schemes, order conditions, and optimized pairsPräsentation Presentation2015
17Auzinger, Winfried ; Hofstätter, Harald ; Ketcheson, David ; Koch, Othmar Practical splitting methods for the adaptive integration of nonlinear evolution equations. Part I: Construction of optimized schemes and pairs of schemesBericht Report2015
18Auzinger, Winfried ; Hofstätter, Harald ; Koch, Othmar ; Quell, Michael ; Thalhammer, Mechthild Adaptive High-order Time-Splitting Methods for Systems of Evolution Equations: Applications in Quantum Dynamics and Pattern FormationPräsentation Presentation2015
19Auzinger, Winfried ; Kassebacher, Thomas ; Koch, Othmar ; Thalhammer, Mechthild Convergence of adaptive splitting and finite element methods for the Schrödinger-Poisson equationPräsentation Presentation2015
20Auzinger, Winfried ; Stolyarchuk, Roksolyana Local error estimation, adaptive time stepping, and global error estimation for the time integration of linear and nonlinear evolution equationsPräsentation Presentation2014