I am solving a nonlinear optimization problem using fmincon, in which I have only 2 decision variables, with the following lower and upper bounds:
lb = [1228.527,837.942]
ub = [1728.527,1337.942]
and the equality constraint: x1 + x2 = 2566.469
my objective function has no closed form solution and calls a program that returns values depending on the values of x1 and x2.
Here is a plot of the values of the objective function for different values of x1 and x2:
However, this picture may be a bit misleading, since the objective function has several small ups and downs when zoomed in:
If I use fmincon default options, the analysis ends at the initial point as a local minimum.
so I have tried using:
options = optimoptions('fmincon','FiniteDifferenceStepSize',1e-3);
The problem I have is that using different initial points, such as:
x0(1) = lb(1) + 0.15*500
x0(2) = lb(2) + 0.85*500
and
x0(1) = lb(1) + 0.85*500
x0(2) = lb(2) + 0.15*500
these result in very different results, such as (1317,1249) and (1653,913)
also, the exitflag I get is 2. I hoped I could get an exitflag of 1 and, at least, similar results with different initial points
Does anyone have any suggestions on how to calibrate fmincon options in this case or which algorithm should I use?
I am running patternsearch now, but I am pretty sure that different initial points will give different results...
