I have the below optimisation problem:

The objective function is quite simple: given a vector `SPREAD`

, I try to find the vector `W`

to maximize `sum(W.SPREAD)`

.

As an example, in dimension 3, this mean I try to maximize `w1 x spread1 + w2 x spread2 + w3 x spread3`

.

Plus, I have three constraints `c1, c2 & c3`

not on `W`

, but on a `POS`

vector where `POS = W2POS(W)`

.

As an example, in dimension 3, contraints are:

`|pos1 + pos2 + pos3| < 5`

`|pos1| + |pos2| + |pos3| < 500`

`Max(pos1, pos2, pos3) < 5`

I wrote the below code which perform some optimization, however, constraints 3 is not respected. How can I solve this problem respecting my constraints?

I wrote the below code:

```
from scipy.optimize import fmin_cobyla
import numpy as np
import pandas as pd
def W2POS(W, PRICE, BETA):
POS = (PRICE * BETA).T.dot(W)
return POS
def objective(W, SPREAD, sign = 1):
er = sum((W * SPREAD.T).sum())
return sign * er
def c1(x, *args):
""" abs(sum(c)) < 500 """
POS = W2POS(x,args[0], args[1])
return POS.apply(abs).sum()
def c2(x, *args):
""" abs(sum()) < 5 """
POS = W2POS(x,args[0], args[1])
return 5. - abs(POS.sum())
def c3(x, *args):
""" abs(max(pos)) < 5 """
POS = W2POS(x,args[0], args[1])
return 5. - POS.apply(abs).max()
# optim
W0 = np.zeros(shape=(len(BETA), 1))
sign = -1
W = fmin_cobyla(objective, W0, cons = [c1, c2, c3], args=(SPREAD,sign),
consargs=(PRICE, BETA), maxfun=100, rhobeg = 0.02).T
print 'Solution:', W
args = [PRICE, BETA]
pos = W2POS(W.T,args[0], args[1])
print 'c1 < 5:', abs(pos.sum())[0]
print 'c2 < 500:', pos.apply(abs).sum()[0]
print 'c3 < 5:', pos.apply(abs).apply(max)[0]
```

You can play with some dummy data that will illustrate c3 being not respected with this code : http://pastebin.com/gjbeePgt