Please help solve a system of differential equation

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Jayesh Jawandhia le 15 Mar 2023

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Commenté : Torsten le 4 Avr 2023

I have a system of differential equation in x,y with boundary conditions. I want to solve it analytically and numerically. The analytical solutions coming in the form of error functions. Can someone please help me find analytical and numerical solution for this, I have been trying for weeks now, really need to solve this for my thesis. Please help.

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Alan Stevens le 15 Mar 2023

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Here's a numerical approach:

First manipulate the equations

tspan = [0, 120];

ic = [80000, 0.001];

[t, xy] = ode45(@rate, tspan, ic);

x = xy(:,1); y = xy(:,2);

subplot(2,1,1)

plot(t,x),grid

xlabel('t'), ylabel('x')

subplot(2,1,2)

plot(t,y),grid

xlabel('t'), ylabel('y')

function dxydt = rate(~,xy)

a = 0.1; b = 0.2; c = -0.1; % Replace with desired values

x = xy(1); y = xy(2);

dxydt = [a-b+c*x*y; % eqn (3)

c*y*(1-y) - a*y/x]; % eqn (5)

end

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Alan Stevens le 16 Mar 2023

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This data looks more like it's related to the logistic function than the error function. The following shows a purely empirical fit:

t = 5:5:120;

x = [15.6700 18.0000 19.0000 19.3300 19.5000 19.6700 19.3300 ...

18.7700 18.6000 18.2000 17.9300 17.9300 17.6700 17.3300 ...

17.1700 16.8300 16.8300 16.1700 15.5000 15.5000 15.8300 ...

15.6700 15.6700 15.6700];

y = [53.4467 61.4233 63.9467 64.6933 65.6633 65.7567 65.6100 ...

65.3000 65.6133 65.9367 66.2833 66.0300 67.0500 65.9600 ...

66.3733 66.7867 66.5233 66.3533 66.6567 66.6400 66.4267 ...

67.3067 67.0300 67.3133];

a = 67; b = 0.2; c = 0.01; abc = [a, b, c];

abc = fminsearch(@(abc) fny(abc, t, y), abc);

a = abc(1); b = abc(2); c = abc(3);

Y = a.*exp(-c*t)./(1+exp(-b*t));

A = 20; B = 0.2; C = 0.01; ABC = [A, B, C];

ABC = fminsearch(@(ABC) fnx(ABC, t, x), ABC);

A = ABC(1);B = ABC(2); C = ABC(3);

X = A.*exp(C*t)./(1+exp(-B*t));

plot(t,x,'ko',t,y,'rs',t,Y,'k',t,X), grid

xlabel('t'),ylabel('x and y')

legend('x','y','yfit','xfit')

axis([0 120 0 90])

hold on

function Fy = fny(abc, t, y)

a = abc(1); b = abc(2); c = abc(3);

Y = a.*exp(-c*t)./(1+exp(-b*t));

d = Y-y;

Fy = sum(norm(d));

end

function Fx = fnx(ABC, t, x)

A = ABC(1); B = ABC(2); C = ABC(3);

X = A.*exp(C*t)./(1+exp(-B*t));

d = X - x;

Fx = sum(norm(d));

end

Alan Stevens le 19 Mar 2023

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@Jayesh Jawandhia Ok. Here is the code I put together to have a quick look. Change the values of a, b and c to your heart's content! I'm not convinced that your odes describe your data, but more than happy to be proved wrong. If you are successful, post your results here. Good luck..

t = 0:300:7200;
x = [15.0000   17.2300   18.1900   18.5000   18.6600   18.8200   18.5000 ...
     17.9600   17.8000   17.4200   17.1600   17.1600   16.9100   16.5900 ...
     16.4300   16.1100   16.1100   15.4700   14.8400   14.8400   15.1500 ...
     15.0000   15.0000   15.0000];
 
 y = [0.5345    0.6142    0.6395    0.6469    0.6566    0.6576    0.6561 ...
      0.6530    0.6561    0.6594    0.6628    0.6603    0.6705    0.6596 ...
      0.6637    0.6679    0.6652    0.6635    0.6666    0.6664    0.6643 ...
      0.6731    0.6703    0.6731];
 
 % Add initial values to data
 x = [12.5 x];
 y = [0.001 y];
 
 % Initial guesses for a, b and c
 %      [a, b, c]
  abc = [1, 1, 1];
 
  % Try fminsearch to estimate better values of a, b and c
  ABC = fminsearch(@(abc) compare(abc, t, x, y), abc);
  
  disp(ABC)  % Display resulting values
  
  % Numerically integrate the odes with resulting values
  [t, XY] = runode(ABC,t);
  
  % Extract fitted values and plot fits vs data
  X = XY(:,1);  Y = XY(:,2);
  subplot(2,1,1)
  plot(t, X, 'r', t, x, 'ro'),grid
  ylabel('x')
  axis([0 7200 0 20])
  subplot(2,1,2)
  plot(t, Y, 'r', t, y, 'ro'),grid
  ylabel('y')
  axis([0 7200 0 1])
 
  % Calculate sum of squared residuals
  function F = compare(abc, t, x, y)
  
           [~, XY] = runode(abc, t);
           X = XY(:,1); Y = XY(:,2);
           dx = x - X;
           dy = y - Y;
           F = norm(dx)+norm(dy);
           
  end
  
  % Call the odes with current values of a, b and c
  function [t, XY] = runode(abc, t)
  
  ic = [12.5, 0.001];
  [t, XY] = ode45(@(t,xy) odefn(t, xy, abc), t, ic);
  end
  
% ODE equations
 function dxydt = odefn(~,xy, abc)
           a = abc(1); b = abc(2); c = abc(3);
           x = xy(1); y = xy(2);
           dxydt = [a-b+c*x*y;
                    c*y*(1-y)-a*y/x];
 
 end

Jayesh Jawandhia le 4 Avr 2023

Hey @Alan Stevens

Hope you are doing well. I have been reading up on these and your solution has been really helpful. I just had a follow-up. We are trying to find a better fit by making a and b as a function of t. I haven't been able to figure out how do I add these to my ode45 solver in Matlab just like what you did here.

Can you please help with this? For simplicity, I am assuming both a and b second order in t, i.e.:

a = mt^2+nt+r

b = pt^2+qt+s

Really thankful for all your help!

Torsten le 4 Avr 2023

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What's the problem ?

function dxydt = rate(t,xy);
  m = ...;
  n = ...;
  r = ...;
  p = ...;
  q = ...;
  s = ...;
  a = m*t^2+n*t+r;
  b = p*t^2+q*t+s;
  x = xy(1);
  y = xy(2);
  dxydt = [a-b+c*x*y;c*y*(1-y)-a*y/x];
end

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