Eulerian Position and Velocity Updates - Compressible Fluid Dynamics

19 Apr 2011
4 Answers
Answer Accepted
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0 votes

Hello Everyone,
It is my first time writing in this forum, so please be patient with me :)
I am writing a code following Smoothed Particle Computation (SPC) method for solving a Compressible Fluid Dynamics Problem.
In my code I got to a point where I need to do the following:
Basically, say at time = 0, I have a certain velocity u, a position x and acceleration a.
Now, I want to update u and x for an amount of time steps, using the following fomulae:
u (t+1) = u(t) + acceleration*dt
x(t+1) = x(t) + u(t+1)*dt
t = original time/time index
t+1 = new time
dt = 1 (for example), acceleration = same for every time step. In my case I would like to have 10 time steps.
How do I do it?
Thanks, Fed
Here is my code so far, just for fashion :
clc, clear
N=61; sigma = 5; m = 1; a=1;
j = 1:61;
x_j = j - 1 + 0.5*sign((N+1)/2 - j).*(1-exp(-0.2.*( j-(N+1)./2).^2) )
for x_i = [1:61]
ro = m/(sqrt(pi)*sigma).*exp((-(x_i-x_j).^2)./sigma^2)
del_ro = (2*m)/(sqrt(pi)*sigma^3).*(x_i-x_j).^2.*exp((-(x_i-x_j).^2)./sigma^2)
u_j = (-(a^2.*log(ro)))./2
acc = (- a^2./ro).*del_ro
end
for k = 1:10
u_j_new(k+1) = u_j(k) +acc(k)
x_j_new(k+1) = [x_j(k).*u_j_new(k)]
ro_new(k+1) = m/(sqrt(pi)*sigma).*exp((-(x_i-x_j_new).^2)./sigma^2)
end

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 Accepted Answer

dwight nwaigwe
dwight nwaigwe on 19 Apr 2011

1 vote

Are u_j x_j acc vectors corresponding to 61 different points? Do you want to treat each point individually? In other words, do you want to find the new position,velocity, and ro of each index?
In that case you would do
for k = 1:10
u_j = u_j +acc
x_j = x_j(k)+u_j_new
ro = m/(sqrt(pi)*sigma).*exp((-(x_i-x_j).^2)./sigma^2)
end

More Answers (3)

Federico
Federico on 21 Apr 2011

0 votes

Thank you very much. I think what you wrote is right. I just cannot put it together with other loops.
I'll keep this posted as I go further with my code.
Anyway, in this code I will be using the Smoothed Particle Hydrodynamics method, so yes I am treating the flow into 61 finite smoothed particle.
Are you into this field (CFD etc etc? Because I feel like I will need some more help and am completely doing this by myself.
cheers
dwight nwaigwe
dwight nwaigwe on 26 Apr 2011

0 votes

Hi Federico, Well, the loop over k is responsible for the evolution of your points in time. Is your first loop for initialization? Where does del_ro come into play?
I'm not into CFD but I am familiar with fluid mechanics and numerical methods (although I may be rusty).
Are you new to programming? If so, don't be afraid because it's not that hard. You just have to learn the "rules" of programming.

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