Finding equilibrium points for an ODE system
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Hi, I have two functions named cdot and ctdot. I want to find the eqilibrium points which means cdot=ctdot=0. Could you please tell me how can I find points (c,ct) which satisfied in cdot=ctdot=0.
c and ct should be positive between [0,2].
Thanks in advance for any help.
vplc=0.16;
delta=0.1;
Ktau=0.045;
Kc=0.1;
K=0.0075;
Kp=0.15;
gamma=5.5;
kb=0.4;
vss=0.044;
alpha0=delta*6.81e-6/(0.002);
alpha1=delta*2.27e-5/(0.002);
Ke=7;
Vs=0.002;
ks=0.1;
Kf=0.18;
kplc=0.055;
ki=2;
A=(-(vss.*c.^2)./(ks.^2))+((Vs.*K.*gamma.^2.*ct.^2)./(ks.^2))+alpha0+alpha1.*((Ke.^4)./(Ke.^4+(gamma.*ct).^4));
h=(-(0.4.*A.*((Kc.^4).*(Kp.^2))./((p.^2.*c.^2.*gamma.*ct.*Kf))));
jin2=alpha1.*Kce.^4./((gamma.*ct).^4+Kce.^4);
p=(vplc.*c.^2/(c.^2+kplc.^2))./ki;
G1=alpha0+jin2;
G2=((1-h)./tau_max).*c.^4;
Fc=(4.*gamma.*Kf).*((c.^3.*p.^2.*h.*ct)./(Kb.*Kp.^2.*Ktau.^4))-(2.*Vss.*c./Ks.^2);
Fct=((gamma.*Kf.*(c.^4).*(p.^2).*h)./(Kb.*Kp.^2.*Ktau.^4))+((Vs.*K.*gamma.^2)./(Ks.^2))-((4.*gamma.^4.*ct.^3.*alpha1.*Kce.^4)./(Kce.^4+(gamma.*ct).^4).^2);
Fh=(gamma.*Kf.*c.^4.*p.^2.*ct)./(Kb.*Kp.^2.*Ktau.^4);
cdot=(Fct).*(G1)+(Fh).*(G2);
ctdot=-G1.*Fc;
3 Comments
James Tursa
on 20 Sep 2022
Can you post an image of the differential equations you are solving?
Star Strider
on 21 Sep 2022
‘... find points (c,ct) which satisfied in cdot=ctdot=0’
They don’t intersect, at least in the regions described, as we discussed in how can I find the intersection of two surface. The value of ‘C’ may need to be negative for an intersection to exist.
M
on 21 Sep 2022
Answers (1)
tol = 10^-5 ; % change the tolerance
idx = abs(cdot)<tol & abs(cddot)<tol ;
[cdot(idx) cddot(idx)]
2 Comments
M
on 20 Sep 2022
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on 21 Sep 2022
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