bvp4c or ode45?
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I am solving two the first order ODEs ('=d/dz, all other variables are known constants):
p0 p0'=-32 beta/R^4
p0p1'=-((2-sigma_v)/sigma_v)*8*p0'/R
I have next conditions
p0(z=0)=p0i (I can choose value)
p0(z=1)=1
p1(z=0)=0
p1(z=1)=0
It is necessary to find p0'(z=0) and p1'(z=0) with shooting method (literature says like that), according to already mentioned p0(z=1)=1 and p1(z=1)=0. *How to connect this two conditions* and shoot p0'(z=0) for already known p1'(z=0)?
*Are that conditions p0'(z=0) and p1'(z=0) necessary*, because these are the first order equations, is there only one initial condition enough?
Instead of missing conditions, I also need to solve numerically two ODEs, from the beginning of text, with Runge Kutta method. How to connect that solving with shooting? Is it possible to find missing condition with bvp4c, as shooting method, and after that solve equation with ode45?
採用された回答
Torsten
2018 年 5 月 3 日
If you know $p_0|_{z=1}=1$ and $p_1|_{z=1}=0$ and you want to know $p_0'|_{z=0}$ and $p_1'|_{z=0}$, you don't need a shooting method.
Just use ODE45 as you already did and define tspan=[1 0]. This way, you integrate back in z-direction from z=1 to z=0. Once you have reached z=0,
$p_0'|_{z=0}=-\dfrac{32 \beta}{R^4}/p_0$
and
$p_1'|_{z=0}=(-\dfrac{2-\sigma_v}{\sigma_v}\dfrac{8}{R}p_0'-p_0'*p_1)/p_0$
Best wishes
Torsten.
5 件のコメント
I G
2018 年 5 月 3 日
Torsten
2018 年 5 月 3 日
Do I need to run ode45 again after this first iteration, but second time with known conditions at z=0?
No, the solution you get by integrating back from 1 to 0 is the solution of your ODEs with p_0(1)=1 and p_1(1)=0.
Do I need to say matlab, at first iteration, that my conditions are not both initial conditions? Because there is, according to help for ode45, in command line vector y0, which need to be contained of initial conditions?
p_0(1)=1 and p_1(1)=0 are your initial conditions (although they are set at the end of the z-interval of integration).
Why are you talking about "first iteration" ? There is no iteration process to solve your ODEs.
Best wishes
Torsten.
Torsten
2018 年 5 月 3 日
If I defined y0=[1 0], does it mean that I gave it 1 for first equation, and 0 for the second equation? Or do I need to have, 4 initial conditions for two equations?
It means that you gave p_0(@tspan(1))=1 and p_1(@tspan(1))=0 as initial conditions. And you need two initial conditions for two first-oder differential equations.
Does it recognize it as initial value for variable-p0 or as initial values for derivative of variable-dp0dz, if I defined equation like this: dp0dz=-32*beta/(p0*R^4)?
y0 is interpreted as initial value vector [p_0,p_1] at tspan(1).
I G
2018 年 5 月 3 日
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