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See the recommended documentation of this function
daskr
DAE solver with zero crossing
Calling Sequence
[r, nn [, hd]] = daskr(x0, t0, t [, atol [, rtol]], res [, jac], ng, surf [, info [, psol] [, pjac]] [, hd])
Arguments
- x0
is either
y0
(ydot0
is estimated bydaskr
with zero as first estimate) or the matrix[y0 ydot0]
.g(t, y0, ydot0)
must be equal to zero. If you only know an estimate ofydot0
, setinfo(7)=1
.- y0
a real column vector of initial conditions.
- ydot0
a real column vector of the time derivative of
y
att0
(may be an estimate).
- t0
a real number, it is the initial instant.
- t
a real scalar or vector. Gives instants for which you want the solution. Note that you can get solution at each daskr's step point by setting
info(2)=1
.- atol, rtol
real scalars or column vectors of same size as
y
or both of size 1.atol
andrtol
give respectively absolute and relative error tolerances of solution. If vectors, the tolerances are specified for each component ofy
.- res
external (function, list or string). Computes the value of
g(t, y, ydot)
. It may be :A Scilab function.
Its calling sequence must be
[r, ires] = res(t, y, ydot)
and must return the residualr = g(t, y, ydot)
and error flagires
.ires = 0
ifres
succeeds to computer
,ires = -1
if residual is locally not defined for(t, y, ydot)
,ires = -2
if parameters are out of admissible range.A list.
This form allows to pass parameters other than t, y, ydot to the function. It must be as follows:
list(res, x1, x2, ...)
where the calling sequence of the function
res
is nowr = res(t, y, ydot, x1, x2, ...)
res
still returnsr = g(t, y, ydot)
as a function of(t, y, ydot, x1, x2, ...)
.Warning: this form must not be used if there is no extra argument to pass to the function.
A string.
It must refer to the name of a C function or a Fortran subroutine linked with Scilab.
In C, the calling sequence must be:
In Fortran, it must be:
subroutine res(t, y, yd, r, ires, rpar, ipar) double precision t, y(*), yd(*),r(*),rpar(*) integer ires, ipar(*)
The
rpar
andipar
arrays must be present but cannot be used.
- jac
external (function, list or string). Computes the value of
dg/dy + cj*dg/dydot
for a given value of parametercj
.A Scilab function.
Its calling sequence must be
r = jac(t, y, ydot, cj)
and must returnr = dg(t, y, ydot)/dy + cj*dg(t, y, ydot)/dydot
wherecj
is a real scalar.A list.
It must be as follows
list(jac, x1, x2, ...)
where the calling sequence of the function
jac
is nowr=jac(t, y, ydot, cj, x1, x2,...)
jac
still returnsdg/dy + cj*dg/dydot
as a function of(t, y, ydot, cj, x1, x2, ...)
.A character string.
It must refer to the name of a C function or a Fortran subroutine linked with Scilab
In C, the calling sequence must be:
In Fortran, it must be:
subroutine jac(t, y, yd, pd, cj, rpar, ipar) double precision t, y(*), yd(*), pd(*), cj, rpar(*) integer ipar(*)
- surf
external (function, list or string). Computes the value of the column vector
surf(t, y)
withng
components. Each component defines a surface. It may be defined by:A Scilab function.
Its calling sequence must be
surf(t, y)
A list.
It must be as follows
where the calling sequence of the function
surf
is nowr = surf(t, y, x1, x2, ...)
A character string.
It must refer to the name of a C function or a Fortran subroutine linked with Scilab.
In C, the calling sequence must be:
In Fortran, it must be:
- info
list which contains
14
elements. Default value islist([], 0, [], [], [], 0, [], 0, [], 0, 0, [], [], 1)
.- info(1)
real scalar which gives the maximum time for which
g
is allowed to be evaluated or an empty matrix[]
if no limits imposed for time.- info(2)
flag which indicates if
daskr
returns its intermediate computed values (= 1
) or only the user specified time point values (= 0
).- info(3)
2
components vector which give the definition[ml,mu]
of band matrix computed byjac
;r(i - j + ml + mu + 1,j) = "dg(i)/dy(j)+cj*dg(i)/dydot(j)"
. Ifjac
returns a full matrix setinfo(3)=[]
. Treat as dummmy ifinfo(8)=1
.- info(4)
real scalar which gives the maximum step size. Set
info(4)=[]
if no limitation.- info(5)
real scalar which gives the initial step size. Set
info(5)=[]
if not specified.- info(6)
set
info(6)=1
if the solution is known to be non negative, else setinfo(6)=0
.- info(7)
if ydot0 is set so that
g(t0, y0, ydot0) = 0
then setinfo(7)=[]
. Otherwise, setinfo(7)=[+-1, ..., +-1]
, withinfo(7)(i) = 1
if y(i) is a differential variable andinfo(7)(i) = -1
if y(i) is an algebraic variable (if its derivatives do not appear explicitly in the function g(t, y, ydot)).- info(8)
direct / Krylov method. Set
info(8)=1
and provide a routine inpsol
if you want the solver to use Krylov iterations, else (daskr's direct method) setinfo(8)=0
.- info(9)
Krylov parameters. Treat as dummy argument if you have set
info(8)=0
. Otherwise, setinfo(9)=[]
orinfo(9)=[maxl kmp nrmax epli]
, where:- maxl = maximum number of iterations in the GMRes algorithm (default
min(5, neq)
),- kmp = number of vectors on which orthogonalization is done in the GMRes algorithm (default maxl),
- nrmax = maximum number of restarts of the GMRes algorithm per nonlinear iteration (default
5
),- epli = convergence test constant in GMRes algorithm (default
0.05
).- info(10)
initial conditions. Treat as dummy argument if
info(7)=[]
. Setinfo(10)=1
if the solver should stop right after computation of the initial conditions, else setinfo(10)=0
.- info(11)
preconditioner computation and LU-factorization routine for
psol
. Treat as dummy argument ifinfo(8)=0
. Setinfo(11)=1
and provide apjac
routine if the externalpsol
should use a specific routine, else setinfo(11)=0
.- info(12)
if you wish to control errors locally on all the variables then set
info(12)=[]
. Otherwise, setinfo(12)=[+-1, ..., +-1]
, withinfo(12)(i) = 1
if y(i) is a differential variable andinfo(12)(i) = -1
if y(i) is an algebraic variable (if its derivatives do not appear explicitly in the function g(t, y, ydot)).- info(13)
heuristic parameters. Treat as dummy argument if
info(7)=[]
. Otherwise, setinfo(13)=[]
orinfo(13)=[mxnit mxnj mxnh lsoff stptol epinit]
, where:- mxnit = maximum number of Newton iterations per Jacobian or preconditioner evaluation (default
5
ifinfo(8)=0
,15
otherwise),- mxnj = maximum number of Jacobian or preconditioner evaluations (default
6
ifinfo(8)=0
,2
otherwise),- mxnh = maximum number of values of the artificial stepsize parameter
h
to be tried if info(7) ≠ [] (default5
),- lsoff = flag to turn off the linesearch algorithm (lsoff = 0 means linesearch is on, lsoff = 1 means it is turned off) (default
0
),- stptol = minimum scaled step in linesearch algorithm (default
(unit roundoff)^(2/3)
),- epinit = swing factor in the Newton iteration convergence test (default
0.01
).- info(14)
verbosity. Set
info(14)=1
for minimal extra printing,info(14)=2
for full printing, else setinfo(14)=0
.
- psol
external (function, list or string). Solves a linear system
P*x = b
, with P being the factored preconditioner that routinepjac
computed beforehand and stored inwp
andiwp
.A Scilab function.
Its calling sequence must be
[r, ier] = psol(wp, iwp, b)
and must return the solution of the system inr
and an error flagier
.A list.
It must be as follows:
list(psol, x1, x2, ...)
where the calling sequence of
psol
is nowpsol(wp, iwp, b, x1, x2, ...)
psol
still returns the solution inr
.A character string.
It must refer to the name of a C function or a Fortran subroutine linked with Scilab
In C, the calling sequence must be:
where the arraysvoid psol (int*neq, double*t, double*y, double*ydot, double*savr, double*wk, double*cj, double*wght, double*wp, int*iwp, double*b, double*eplin, int*ier, double*rpar, int*ipar)
wp
andiwp
contain matrix elements of LU-factored preconditionerP
,wp
being the values andiwp
the pivots used in the factorization.In Fortran, it must be:
subroutine psol (neq, t, y, ydot, savr, wk, cj, wght, wp, iwp, b, eplin, ier, rpar, ipar) double precision t,y(*), ydot(*), savr(*), wk(*), cj, wght(*), wp(*), b(*), eplin, rpar(*) integer neq, iwp(*), ier, ipar(*)
- pjac
external (function, list or string). Computes the value of
dg/dy + cj*dg/dydot
for a given value of parametercj
and LU-factorizes it in two arrays, real and integer.A Scilab function.
Its calling sequence must be
[wp, iwp, ires] = pjac(neq, t, y, ydot, h, cj, rewt, savr)
and in return, the arrayswp
andiwp
must contain all factored preconditioner information.A list.
It must be as follows
list(pjac, x1, x2, ...)
where the calling sequence of
pjac
ispjac(neq, t, y, ydot, h, cj, rewt, savr, x1, x2,...)
pjac
still returns factorizeddg/dy + cj*dg/dydot
as a function of(neq, t, y, ydot, h, cj, rewt, savr, x1, x2, ...)
.A character string.
It must refer to the name of a C function or a Fortran subroutine linked with Scilab
In C, the calling sequence must be:
void pjac (double*res, int*ires, int*neq, double*t, double*y, double*ydot, double*rewt, double*savr, double*wk, double*h, double*cj, double*wp, int*iwp, int*ier, double*rpar, int*ipar)
In Fortran, it must be:
subroutine pjac (res, ires, neq, t, y, ydot, rewt, savr, wk, h, cj, wp, iwp, ier, rpar, ipar) double precision res(*), t, y(*), ydot(*), rewt(*), savr(*), wk(*), h, cj, wp(*), rpar(*) integer ires, neq, iwp(*), ier, ipar(*)
- hd
real vector which allows to store the
daskr
context and to resume integration.- r
real matrix. Each column is the vector
[t; x(t); xdot(t)]
wheret
is the time index for which the solution has been computed,x(t)
is the value of the computed solution,xdot(t)
is the derivative of the computed solution.- nn
a vector with two entries
[times num]
,times
is the value of the time at which the surface is crossed,num
is the number of the crossed surface.
Description
Solution of the implicit differential equation:
g(t, y, ydot) = 0 y(t0) = y0 and ydot(t0) = ydot0
Returns the surface crossing instants and the number of the surface
reached in nn
.
Detailed examples can be found in SCI/modules/differential_equations/tests/unit_tests/daskr.tst
Examples
// dy/dt = ((2*log(y)+8)/t-5)*y, y(1) = 1, 1 <= t <= 6 // g1 = ((2*log(y)+8)/t-5)*y // g2 = log(y) - 2.2491 y0 = 1; t = 2:6; t0 = 1; y0d = 3; atol = 1.d-6; rtol = 0; ng = 2; deff('[delta, ires] = res1(t, y, ydot)', 'ires = 0; delta = ydot-((2*log(y)+8)/t-5)*y') deff('[rts] = gr1(t, y)', 'rts = [((2*log(y)+8)/t-5)*y; log(y)-2.2491]') [yy, nn] = daskr([y0, y0d], t0, t, atol, rtol, res1, ng, gr1); nn // Should return nn = [2.4698972 2]
See Also
- ode — Solucionador de equações diferenciais ordinárias
- dasrt — Solucionador de equações diferenciais algébricas com cruzamento de zeros
- dassl — Equação diferencial algébrica
- impl — equações diferenciais algébricas
- fort — Fortran or C user routines call
- link — dynamic linker
- external — objeto Scilab, função ou rotina externa
History
Versão | Descrição |
5.5.0 | daskr solver added |
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