I need help solving a system of differential equations. The equations are given below, in matrix form. The problem that I'm having is regarding the fact that I have time dependant elements in the matrices.

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Jelena Kresoja 2020 年 8 月 4 日

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コメント済み: Jelena Kresoja 2020 年 8 月 14 日

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Walter Roberson 2020 年 8 月 11 日

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No error message for me.

Rs = 1; %systemic resistance
Rm = 0.005; %mitral valve resistance
Ra = 0.001; %aortic valve resistance
Rc = 0.0398; %chracteristic resistance
Cr = 4.4; %left atrial compliance
Cs = 1.33; %systemic compliance
Ca = 0.08; %aortic compliance
Ls = 0.0005; %inertance in aorta
hr = 60; %hear rate
Emax = 2; %max elastance          
Emin = 0.06; %min elastance
tc = 60/hr;
t = 0:0.01:tc;
Tmax = 0.2+0.15*tc;
syms t
syms x1(t) x2(t) x3(t) x4(t) x5(t)
x = [x1; x2; x3; x4; x5];
C(t) = 1./((Emax-Emin)*(1.55.*(((((t./Tmax)./0.7).^1.9)./(1+(((t./Tmax)./0.7).^1.9))).*(1./(1+(((t./Tmax)./1.17).^21.9)))))+Emin);
Cdot = diff(C,t);
M1 = [-Cdot./C, 0, 0, 0, 0;
    0, -1./(Rs.*Cr), 1./(Rs.*Cr), 0, 0;
    0, 1./(Rs.*Cs), -1./(Rs.*Cr), 0, 1./Cs;
    0, 0, 0, 0, -1./Ca;
    0, 0, -1./Ls, 1./Ls, -Rc./Ls];
 M2 = [1./C(t) , -1./C(t);
    -1./Cr, 0;
    0, 0;
    0, 1./Ca;
    0, 0];
M3 = [(x2(t)-x1(t))./Rm; (x1(t)-x4(t))./Ra];
 dx = diff(x);
eqn = dx(t) == M1(t)*x(t) + M2*M3;
%now follow odeFunction first example
[eqs,vars] = reduceDifferentialOrder(eqn,x(t));
[M,F] = massMatrixForm(eqs,vars);
f = M\F;
odefun = odeFunction(f,vars);
%hen
initConditions = [vector of 5 values];   %[x1(0), x2(0), x3(0), x4(0), x5(0)];
tspan = [0 10];   %or as appropriate
%and run
[t, x] = ode45(odefun, tspan, initConditions);

Walter Roberson 2020 年 8 月 12 日

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In MATLAB in numeric mode,

r = @(expression) expression.*(expression > 0);

unless expression can be infinite. If the expression can be infinite then more work has to be done.

The version with sign() fails for negative infinity.

In MATLAB in numeric mode, you can also use

r = @(expression) max(0, expression)

which does not have the problem with -infinity. However, I tend to avoid using min() and max() for this kind of work as it is not uncommon for me to want to be able to pass in symbolic expressions, and min() and max() do not play nicely with symbolic expressions.

All of these versions, using sign() or .*(logical) or max() or min(), cannot be differentiated at 0. The same is also true if you code using piecewise(): you cannot differentiate at 0...

... And that is important for the ode*() functions. The ode*() functions all require that the first derivative of the coded functions are continuous, as the mathematics that they are designed against for optimal evaluation points require first derivatives to be continuous.

Therefore when you want to switch between 0 and not-zero, you must use an event function to stop integration, and then you restart integration.

Walter Roberson 2020 年 8 月 14 日

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You have to loop on the ode45() call, like

mint = 0; maxt = 60;
x0 = appropriate vector
all_t = {}:
all_x = {};
while true
    [t, x] = ode45(YourFunction, [mint maxt], x0, opts);
    all_t{end+1} = t;
    all_x{end+1} = x;
    mint = t(end);
    if mint == maxt; break; end   %we are done
    x0 = x(end,:);
end

It is okay if YourFunction has if statements in it, as long as they always evaluate to the same thing for any one call to ode45()

Jelena Kresoja 2020 年 8 月 14 日

Im so sorry i literally dont get whats written here, or where im supposed to put this.....

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hosein Javan 2020 年 8 月 10 日

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https://jp.mathworks.com/matlabcentral/answers/575152-i-need-help-solving-a-system-of-differential-equations-the-equations-are-given-below-in-matrix-for#answer_477661

if you are solving a circuit with time-variant capacitors then your state equations are no longer in "Xdot=A*x+B*U", and they are expressed in general form "Xdot=f(X,U)". you have use ode solvers.

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Walter Roberson 2020 年 8 月 14 日

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この回答への直接リンク

https://jp.mathworks.com/matlabcentral/answers/575152-i-need-help-solving-a-system-of-differential-equations-the-equations-are-given-below-in-matrix-for#answer_479802

MATLAB Online で開く

Rs = 1; %systemic resistance
Rm = 0.005; %mitral valve resistance
Ra = 0.001; %aortic valve resistance
Rc = 0.0398; %chracteristic resistance
Cr = 4.4; %left atrial compliance
Cs = 1.33; %systemic compliance
Ca = 0.08; %aortic compliance
Ls = 0.0005; %inertance in aorta
hr = 60; %hear rate
Emax = 2; %max elastance          
Emin = 0.06; %min elastance
tc = 60/hr;
t = 0:0.01:tc;
Tmax = 0.2+0.15*tc;
syms t
syms x1(t) x2(t) x3(t) x4(t) x5(t)
x = [x1; x2; x3; x4; x5];
r = @(v) heaviside(v) * v
C(t) = 1./((Emax-Emin)*(1.55.*(((((t./Tmax)./0.7).^1.9)./(1+(((t./Tmax)./0.7).^1.9))).*(1./(1+(((t./Tmax)./1.17).^21.9)))))+Emin);
Cdot = diff(C,t);
M1 = [-Cdot./C, 0, 0, 0, 0;
    0, -1./(Rs.*Cr), 1./(Rs.*Cr), 0, 0;
    0, 1./(Rs.*Cs), -1./(Rs.*Cr), 0, 1./Cs;
    0, 0, 0, 0, -1./Ca;
    0, 0, -1./Ls, 1./Ls, -Rc./Ls];
 M2 = [1./C(t) , -1./C(t);
    -1./Cr, 0;
    0, 0;
    0, 1./Ca;
    0, 0];
M3 = [r(x2(t)-x1(t))./Rm; r(x1(t)-x4(t))./Ra];
 dx = diff(x);
eqn = dx(t) == M1(t)*x(t) + M2*M3;
%now follow odeFunction first example
[eqs,vars] = reduceDifferentialOrder(eqn,x(t));
[M,F] = massMatrixForm(eqs,vars);
f = M\F;
odefun = odeFunction(f,vars);
%hen
initConditions = [vector of 5 values];   %[x1(0), x2(0), x3(0), x4(0), x5(0)];
tspan = [0 10];   %or as appropriate
mint = tspan(1);
maxt = tspan(end);
x0 = initConditions;
all_t = {};
all_x = {};
opts = odeset('events', @eventsFun);
while true
  [t, x] = ode45(odefun, [mint, maxt], x0, opts);
  all_t{end} = t;
  all_x{end} = x;
  mint = t(end);
  x0 = x(end,:);
  if mint == maxt; break; end
end
function [val, isterminal, dir] = eventsFun(t,x)
  val(1) = x(2) - x(1);
  val(2) = x(1) - x(4);
  isterminal = [0; 0]; 
  dir = [0; 0]; 
end