Intel ODE Solver Library - Intel ODE Solver Library - Сообщения
#1 Опубликовано: 31.01.2019 17:48:55
Intel ODE Solver Library
Functions list: rkm9st(5), mk52lfn(5), mk52lfa(5), rkm9mkn(5), rkm9mka(5).
rkm9st(init, x1, x2, intvls, D) A specialized routine for solving non-stiff and middle-stiff ODE systems using the explicit method, which is based on the 4th order Merson’s method and the 1st order multistage method of up to and including 9 stages with stability control.
mk52lfn(init, x1, x2, intvls, D) A specialized routine for solving stiff ODE systems using the implicit method based on L-stable (5,2)-method with the numerical Jacobi matrix, which is computed by the routine.
mk52lfa(init, x1, x2, intvls, D) A specialized routine for solving stiff ODE systems using the implicit method based on L-stable (5,2)-method with numerical or analytical computation of the Jacobi matrix. The user must provide a routine for this computation.
rkm9mkn(init, x1, x2, intvls, D) A specialized routine for solving ODE systems with a variable or a priori unknown stiffness; automatically chooses the explicit or implicit scheme in every step and computes the numerical Jacobi matrix when necessary.
rkm9mka(init, x1, x2, intvls, D) A specialized routine for solving ODE systems with a variable or a priori unknown stiffness; automatically chooses the explicit or implicit scheme in every step. The user must provide a routine for numerical or analytical computation of the Jacobi matrix.
Arguments:
- init is either a vector of n real initial values, where n is the number of unknowns (or a single scalar initial value, in the case of a single ODE).
- x1 and x2 are real, scalar endpoints of the interval over which the solution to the ODE(s) is evaluated. Initial values in init are the values of the ODE function(s) evaluated at x1.
- intvls is the integer number of discretization intervals used to interpolate the solution function. The number of solution points is the number of intervals + 1.
- D is a vector function of the form D(x,y) specifying the right-hand side of the system
[albumimg]1558[/albumimg] [albumimg]1568[/albumimg] [albumimg]1569[/albumimg] [albumimg]1529[/albumimg] [albumimg]1557[/albumimg]
iode.examples.sm
iode.kinetic1.sm
iode.kinetic2.sm
iode.kinetic3.sm
iode.integrate.sm
iode.test1.sm
iode.test2.sm
iode.Amplitude detector.sm
Box_models.sm
iode.examples.pdf
iode.kinetic1.pdf
iode.kinetic2.pdf
iode.kinetic3.pdf
iode.integrate.pdf
iode.test1.pdf
iode.test2.pdf
iode.Amplitude detector.pdf
Box_models.pdf
Documents:
Intel ODE Solver Library Reference Manual (2018).pdf
See also:
● [topic=726]Mathcad Toolbox[/topic]
● [topic=1918]DotNumerics[/topic]
● [topic=13809]SADEL[/topic]
● [topic=1970]Matlab C++ Math Library[/topic]
● [topic=17063]OSLO[/topic]
● [topic=17067]lsoda[/topic]
● [topic=1997]GNU Scientific Library (GSL)[/topic]
Functions list: rkm9st(5), mk52lfn(5), mk52lfa(5), rkm9mkn(5), rkm9mka(5).
rkm9st(init, x1, x2, intvls, D) A specialized routine for solving non-stiff and middle-stiff ODE systems using the explicit method, which is based on the 4th order Merson’s method and the 1st order multistage method of up to and including 9 stages with stability control.
mk52lfn(init, x1, x2, intvls, D) A specialized routine for solving stiff ODE systems using the implicit method based on L-stable (5,2)-method with the numerical Jacobi matrix, which is computed by the routine.
mk52lfa(init, x1, x2, intvls, D) A specialized routine for solving stiff ODE systems using the implicit method based on L-stable (5,2)-method with numerical or analytical computation of the Jacobi matrix. The user must provide a routine for this computation.
rkm9mkn(init, x1, x2, intvls, D) A specialized routine for solving ODE systems with a variable or a priori unknown stiffness; automatically chooses the explicit or implicit scheme in every step and computes the numerical Jacobi matrix when necessary.
rkm9mka(init, x1, x2, intvls, D) A specialized routine for solving ODE systems with a variable or a priori unknown stiffness; automatically chooses the explicit or implicit scheme in every step. The user must provide a routine for numerical or analytical computation of the Jacobi matrix.
Arguments:
- init is either a vector of n real initial values, where n is the number of unknowns (or a single scalar initial value, in the case of a single ODE).
- x1 and x2 are real, scalar endpoints of the interval over which the solution to the ODE(s) is evaluated. Initial values in init are the values of the ODE function(s) evaluated at x1.
- intvls is the integer number of discretization intervals used to interpolate the solution function. The number of solution points is the number of intervals + 1.
- D is a vector function of the form D(x,y) specifying the right-hand side of the system
[albumimg]1558[/albumimg] [albumimg]1568[/albumimg] [albumimg]1569[/albumimg] [albumimg]1529[/albumimg] [albumimg]1557[/albumimg]
iode.examples.sm
iode.kinetic1.sm
iode.kinetic2.sm
iode.kinetic3.sm
iode.integrate.sm
iode.test1.sm
iode.test2.sm
iode.Amplitude detector.sm
Box_models.sm
iode.examples.pdf
iode.kinetic1.pdf
iode.kinetic2.pdf
iode.kinetic3.pdf
iode.integrate.pdf
iode.test1.pdf
iode.test2.pdf
iode.Amplitude detector.pdf
Box_models.pdf
Documents:
Intel ODE Solver Library Reference Manual (2018).pdf
See also:
● [topic=726]Mathcad Toolbox[/topic]
● [topic=1918]DotNumerics[/topic]
● [topic=13809]SADEL[/topic]
● [topic=1970]Matlab C++ Math Library[/topic]
● [topic=17063]OSLO[/topic]
● [topic=17067]lsoda[/topic]
● [topic=1997]GNU Scientific Library (GSL)[/topic]
Russia ☭ forever, Viacheslav N. Mezentsev
3 пользователям понравился этот пост
NDTM Amarasekera 01.02.2019 01:43:00, Davide Carpi 01.02.2019 10:56:00, Radovan Omorjan 01.02.2019 15:35:00
#2 Опубликовано: 11.07.2021 09:47:22
Hmm...even dn_GearsBDF() will go nuts for this example.
Just for the record...
iode.Amplitude detector-1.sm
EDIT: mk52lfa() and mk52lfn() will also perform well here
Just for the record...
iode.Amplitude detector-1.sm
EDIT: mk52lfa() and mk52lfn() will also perform well here
When Sisyphus climbed to the top of a hill, they said: "Wrong boulder!"
#3 Опубликовано: 11.07.2021 10:15:24
Hmm...even dn_GearsBDF() will go nuts for this example.
From recollection,NONE ODE solve that one.
Cheers ... Jean.
ODE rkfixed Pulse Pitfall.sm
#4 Опубликовано: 11.07.2021 12:20:01
Hmm...even dn_GearsBDF() will go nuts for this example.
A little help is needed here
Russia ☭ forever, Viacheslav N. Mezentsev
1 пользователям понравился этот пост
Radovan Omorjan 11.07.2021 15:58:00
#5 Опубликовано: 11.07.2021 15:59:35
I should have guessed that 
. Thank you.
. Thank you.When Sisyphus climbed to the top of a hill, they said: "Wrong boulder!"
#6 Опубликовано: 09.12.2021 16:12:56
Plugin updated.
Changes:
- added support for ODE systems in mathematical form;
- refactored.
Russia ☭ forever, Viacheslav N. Mezentsev
2 пользователям понравился этот пост
#7 Опубликовано: 20.12.2021 16:17:42
Plugin updated.
Changes:
- solution restructured;
- converting the task for the ODE solver to the numerical form is now performed through the Mathcad Toolbox plugin (to avoid code duplication), so it must be installed;
- refactored.
Solvers that support mathematical notation now reuse code from the Mathcad Toolbox plugin. Now there is no need to recompile every such plugin.
Russia ☭ forever, Viacheslav N. Mezentsev
-
Новые сообщения
-
Нет новых сообщений