I agree that this site is using cookies. You can find further informations
here
.
X
Login
Merkliste (
0
)
Home
About us
Home About us
Our history
Profile
Press & public relations
Friends
The library in figures
Exhibitions
Projects
Training, internships, careers
Films
Services & Information
Home Services & Information
Lending and interlibrary loans
Returns and renewals
Training and library tours
My Account
Library cards
New to the library?
Download Information
Opening hours
Learning spaces
PC, WLAN, copy, scan and print
Catalogs and collections
Home Catalogs and Collections
Rare books and manuscripts
Digital collections
Subject Areas
Our sites
Home Our sites
Central Library
Law Library (Juridicum)
BB Business and Economics (BB11)
BB Physics and Electrical Engineering
TB Engineering and Social Sciences
TB Economics and Nautical Sciences
TB Music
TB Art & Design
TB Bremerhaven
Contact the library
Home Contact the library
Staff Directory
Open access & publishing
Home Open access & publishing
Reference management: Citavi & RefWorks
Publishing documents
Open Access in Bremen
zur Desktop-Version
Toggle navigation
Merkliste
1 Ergebnisse
1
On the SHASTA FCT Algorithm for the Equation $$\frac{\parti..:
Ikeda, Tsutomu
;
Nakagawa, Tomoyasu
Mathematics of Computation. 33 (1979) 148 - p. 1157-1169 , 1979
Link:
https://www.jstor.org/stable/2006453
RT Journal T1
On the SHASTA FCT Algorithm for the Equation $$\frac{\partial \rho} {\partial t} + \frac{\partial}{\partial x}(\upsilon(\rho)\rho) = 0$$
UL https://suche.suub.uni-bremen.de/peid=jstor-2006453&Exemplar=1&LAN=DE A1 Ikeda, Tsutomu A1 Nakagawa, Tomoyasu PB American Mathematical Society YR 1979 SN 0025-5718 SN 1088-6842 K1 Conservation law K1 generalized solution K1 entropy condition K1 positive finite difference scheme K1 Flux-Corrected Transport (FCT) technique K1 antidiffusion operator K1 ShASTA K1 $L^\infty$-stability K1 $L^1 \operatorname{loc}$-convergence K1 function having locally bounded variation K1 schemes in conservation form K1 Mathematics K1 Physical sciences K1 Physics K1 Thermodynamics K1 Thermodynamic properties K1 Entropy K1 Applied mathematics K1 Computational mathematics K1 Pure mathematics K1 Calculus K1 Differential calculus K1 Differential equations K1 Cauchy problem K1 Applied sciences K1 Applied physics K1 Conservation laws K1 Mathematical values K1 Mathematical variables K1 Real variables K1 Geometry K1 Geometric shapes K1 Polytopes K1 Polygons K1 Tetragons K1 Trapezoids JF Mathematics of Computation VO 33 IS 148 SP 1157 OP 1169 LK http://dx.doi.org/https://www.jstor.org/stable/2006453 DO https://www.jstor.org/stable/2006453 SF ELIB - SuUB Bremen
Export
RefWorks (nur Desktop-Version!)
Flow
(Zuerst in
Flow
einloggen, dann importieren)