BIT Numerical Mathematics

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Journal description

Title Titel
BIT Numerical Mathematics
 
e-ISSN
1572-9125
 
ISSN
0006-3835
 
Publisher Herausgeber
SPRINGER
 
Publisher's Address Herausgeber Adresse
VAN GODEWIJCKSTRAAT 30, DORDRECHT, NETHERLANDS, 3311 GZ
 
Listed in SCI Aufgelistet im SCI
 
Peer reviewed Begutachtet
 
 

Publications Publikationen

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Subject:  Applied Mathematics

Results 1-13 of 13 (Search time: 0.35 seconds).

PreviewAuthor(s)TitleTypeIssue Date
1Auzinger, Winfried ; Lehner, Herbert ; Weinmüller, Ewa An efficient asymptotically correct error estimator for collocation solutions to singular index-1 DAEsArtikel Article2011
2Jawecki, Tobias ; Auzinger, Winfried ; Koch, Othmar Computable upper error bounds for Krylov approximations to matrix exponentials and associated phi-functionsArtikel Article 2020
3Nannen, Lothar ; Wess, Markus Computing scattering resonances using perfectly matched layers with frequency dependent scaling functionsArtikel Article 2018
4Hohage, Thorsten ; Nannen, Lothar Convergence of infinite element methods for scalar waveguide problemsArtikel Article 2015
5Auzinger, Winfried ; Lapinska, Magdalena Convergence of rational multistep methods of Adams-Padé typeArtikel Article 10-Sep-2012
6Auzinger, W. ; Frank, R. ; Kirlinger, G. Extending convergence theory for nonlinear stiff problems, part IArtikel Article1996
7Blieberger, J. ; Schmid, U. FCFS Scheduling in a Hard Real-Time Environment under Rush-Hour ConditionsArtikel Article1992
8Sickenberger, Thorsten ; Weinmüller, Ewa ; Winkler, Renate Local Error Estimates for Moderately Smooth Problems: Part I - ODEs and DAEsArtikel Article2007
9Sickenberger, Thorsten ; Weinmüller, Ewa ; Winkler, Renate Local error estimates for moderately smooth problems: Part II - SDEs and SDAEs with small noiseArtikel Article2009
10Burkotová, Jana ; Rachůnková, Irena ; Weinmüller, Ewa B. On singular BVPs with unsmooth data. Part 2: Convergence of the collocation schemes.Artikel Article 2017
11Auzinger, Winfried ; Kramer, Felix On the stability and error structure of BDF schemes applied to linear parabolic evolution equationsArtikel Article2010
12Graham, I. G. ; Löhndorf, M. ; Melenk, J. M. ; Spence, E. A. When is the error in the h-BEM for solving the Helmholtz equation bounded independently of k?Artikel Article2015
13Arnold, Anton ; Klein, Christian ; Ujvari, Bernhard WKB-method for the 1D Schrödinger equation in the semi-classical limit: enhanced phase treatmentArtikel Article 2022