PDE propagating from point source

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María Jesús il 11 Lug 2015

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Commentato: Nicholas Mikolajewicz il 2 Feb 2018

I want to solve numerically a nonlinear diffusion equation from an instantaneous point source. Thus, I have initial conditions, but not boundary conditions. How should I go about writing a code to solve circular propagation from a point?

Thanks!!

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Torsten il 13 Lug 2015

What is the equation you try to solve (because you are talking about a nonlinear diffusion equation) ?

Best wishes

Torsten

María Jesús il 14 Lug 2015

$\frac{\partial C}{\partial t}=r^{1-s}\frac{\partial}{\partial r}[r^{s-1}D\frac{\partial C}{\partial r})]$ where $s$ is constant and $D=D_0(\frac{\partial C}{\partial C_0})^n$ and $n>0$

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Answer 1

Torsten il 14 Lug 2015

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I assume you want the point source appear at r=0.

Choose the interval of integration as [0:R] where R is big enough to ensure that C=C(t=0) throughout the period of integration.

As initial condition, choose an approximation to the delta function.

As boundary conditions, choose dC/dr = 0 at both ends.

Best wishes

Torsten.

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María Jesús il 25 Lug 2015

Apri in MATLAB Online

I've written the code, but it gives errors... can anyone help with this? The code is

clear all

m = 1;

r = linspace(0, 1, 20);

t = linspace(0, 2, 10);

u = pdepe(m, @pat2, @ic1, @bc1, r, t);

surf(r, t, u);

title('Surface plot of solution');

xlabel('Distance r');

ylabel('Time t');

figure

plot(r, u(end,:))

title('Solution at t = 2')

xlabel('Distance r')

ylabel('u(r,2)')

function [c, b, s, D] = pat2(r, t, u, DuDr)

n = 1;

D_0 = 1;

D = D_0/(KronD(r, 0))^n;

c = 1;

b = D*u^n*DuDr;

s = 0;

function [d] = KronD(j,k)

if nargin < 2

error('Too few inputs. See help KronD')

elseif nargin > 2

error('Too many inputs. See help KronD')

end

if j == k

d = Inf;

else

d = 0;

end

function [pl, ql, pr, qr] = bc1(rl, ul, rr, ur, t)

pl = ul;

ql = 0;

pr = ur;

qr = 0;

function value = ic1(r)

value = KronD(r, 0);

And the error is

Warning: Failure at t=0.000000e+00. Unable to meet integration tolerances without reducing the step size below the smallest value allowed (7.905050e-323) at time t. > In ode15s (line 668) In pdepe (line 289) In pattle2_0 (line 7) Warning: Time integration has failed. Solution is available at requested time points up to t=0.000000e+00. > In pdepe (line 303) In pattle2_0 (line 7) Error using surf (line 57) Z must be a matrix, not a scalar or vector.

Error in pattle2_0 (line 8) surf(r, t, u);

Thanks again!!!

Torsten il 27 Lug 2015

Apri in MATLAB Online

1. You will have to work with a numerical approximation to the delta function. I gave you a suitable link.

2. Your boundary conditions are incorrect. You will have to set

pl=0, ql=1, pr=0, qr=1

3. I don't understand your definition of D. The setting

D = D_0/(KronD(r, 0))^n;

doesn't make sense.

Best wishes

Torsten.

Nicholas Mikolajewicz il 2 Feb 2018

Torsten, regarding the earlier answer you provided, whats the reasoning behind using the dirac delta approximation for the point source rather than just setting the initial condition to the source concentration/density as u0(x==0) = initial condition?

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PDE propagating from point source

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