Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

I'm using CVXOPT to do quadratic programming to compute the optimal weights of a potfolio using mean-variance optimization. There is a great example at http://abel.ee.ucla.edu/cvxopt/userguide/coneprog.html#quadratic-programming. However, the arguments are in a regularized form (according to the author). The example is a basic version. I am looking to do a bit of a more complex problem where:




x'a >= g  
x'1 = 0  
x >= -Wb  
x <= c1 - Wb  

x: active weights of assets (active weight = portfolio weight - benchmark weight)  
S: covariance matrix of asset returns  
a: expected stock excess returns  
g: target gain  
Wb: weights of assets in the benchmark  
c: upper limit (weight) of any asset in the portfolio  

Assume all the variables are computed or known.

The basic example presented in the documentation:




p'x >= g  
1'x = 1

Where p are the asset returns.

What I do not know (referring to the code at http://abel.ee.ucla.edu/cvxopt/examples/book/portfolio.html and optimization problem above):

1.I think these arguments setup the constraints but I'm not entirely sure:

G = matrix(0.0, (n,n))
G[::n+1] = -1.0
h = matrix(0.0, (n,1))
A = matrix(1.0, (1,n))
b = matrix(1.0)

2.I believe this is part of the minimization problem in "regulated form", which I'm not sure what means:

mus = [ 10**(5.0*t/N-1.0) for t in xrange(N) ]

3.What the arguments to qp are (solver.qp is the quadratic optimizer):

xs = [ qp(mu*S, -pbar, G, h, A, b)['x'] for mu in mus ]

Looking at the documentation, I'm pretty sure that mu*S (the first argument) is the objective function to be minimzed and -pbar are the returns. This looks like a maximization problem however (maximizing negative returns).

I do not know, however how the other arguments are used.

I am looking for help using the optimizer given my minimization problem and constraints above.

share|improve this question

1 Answer 1

I read the docs and I think you have to use the function with the following parameters. I assume that x has size n:

P = S
q = (0,....0)

A = (1, ...... 1)
b = (0)

G is vertically stacked from


where I_n is the identity matrix of size n x n . And the corresponding right hand side h is


That is: one -g, n times Wb and n times C1-Wb.


share|improve this answer
Thanks for the response, but I'm not following for G and h... For G, what do you mean -a, ... -a? and +I_n? For h, I'm not clear at all. Also, what is your logic for your thoughts? –  strimp099 Sep 27 '11 at 20:47
I just formulated your problem so that it matches the specification given by your link to cvxopt. –  rocksportrocker Sep 28 '11 at 5:15
-a .... -a was wrong. I_n is the identity matrix of size n, that is the matrix is zero outside the diagonl. The diagonal contains only ones. –  rocksportrocker Sep 28 '11 at 5:17
h is a vector. it's entries are given as I described it. The first entry is -g, then n times Wb, then n times "C1-Wb" –  rocksportrocker Sep 28 '11 at 5:18

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.