impl - differential algebraic equation
Solution of the linear implicit differential equation
A(t,y) dy/dt=g(t,y), y(t0)=y0
t0 is the initial instant, y0 is the vector of initial conditions Vector ydot0 of the time derivative of y at t0 must also be given. r The input res is an external i.e. a function with specified syntax, or the name a Fortran subroutine or a C function (character string) with specified calling sequence or a list.
If res is a function, its syntax must be as follows:
r = res(t,y,ydot)
where t is a real scalar (time) and y and ydot are real vector (state and derivative of the state). This function must return r=g(t,y)-A(t,y)*ydot .
If res is a character string, it refers to the name of a Fortran subroutine or a C function. See SCIDIR/routines/default/Ex-impl.f for an example to do that.
res can also be a list: see the help of ode .
The input adda is also an external.
If adda is a function, its syntax must be as follows:
r = adda(t,y,p)
and it must return r=A(t,y)+p where p is a matrix to be added to A(t,y) .
If adda is a character string, it refers to the name of a Fortran subroutine or a C function. See SCIDIR/routines/default/Ex-impl.f for an example to do that.
adda can also be a list: see the help of ode .
The input jac is also an external.
If adda is a function, its syntax must be as follows:
j = jac(t,y,ydot)
and it must return the Jacobian of r=g(t,y)-A(t,y)*ydot with respect to y .
If jac is a character string, it refers to the name of a Fortran subroutine or a C function. See SCIDIR/routines/default/Ex-impl.f for an example to do that.
jac can also be a list: see the help of ode .
y=impl([1;0;0],[-0.04;0.04;0],0,0.4,'resid','aplusp'); // Using hot restart //[x1,w,iw]=impl([1;0;0],[-0.04;0.04;0],0,0.2,'resid','aplusp'); // hot start from previous call //[x1]=impl([1;0;0],[-0.04;0.04;0],0.2,0.4,'resid','aplusp',w,iw); //maxi(abs(x1-x))