Non convex objective funtion

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Nikolas Spiliopoulos
Nikolas Spiliopoulos on 22 Sep 2021
Commented: Nikolas Spiliopoulos on 23 Sep 2021
Ran in:
Hi there,
I a have an objective function which in some areas is not convex.
Is there any way to relax it and then use fmin con ?
thanks!!
Here I have writen a piece of code to prove that second derivative for a particular temeprature T_ext is negative:
cell_capacity=45;
T_ext=25;
T=273.15+T_ext;
B2=-0.0067*T+2.35;
%% B1
a=8.89*10^-6;
b=-0.0053;
c=0.7871;
B1=a*T^2+b*T+c;
syms x
f=B1*exp(B2*x/cell_capacity)*(x^2/(2*0.8*cell_capacity));
p=diff(f);
q=diff(p);
ff = matlabFunction(q);
x=(0.1*cell_capacity):1:(0.9*cell_capacity);
figure(1)
title('Second derivative for different temperatures')
xlabel('Current (Ah)')
ylabel('second derivative')
plot(x, ff(x))
hold on
ff_final=ff(x)';
  5 Comments
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Walter Roberson
Walter Roberson on 22 Sep 2021
You can never be sure of global minimality for non-convex , n-dimensional minimization.
... unless you can use calculus to find the complete set of critical points, and you can find all of the boundary points, and you can evaluate the function at all of the critical points and all of the boundary points and select the minima.
However, you need symbolic processing to find critical points once you get beyond fairly simple functions.
Nikolas Spiliopoulos
Nikolas Spiliopoulos on 23 Sep 2021
ok thanks,
that's why I was wondering if I could convert it to a convex function.
Anyway, I'll see what I can do thanks

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