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 would like to solve the below problem:
$min_C \sum_i \phi(c_i)$ s.t $\sum_i c_i=1 $ and $c_i\geq 0$ where $i=1 \cdots k$ and $C = [c_i]$.
Here $\phi(x)$ is concave function. for example $\phi(x) = 2x - x^2$.

Given any valid initial point, i know the solution would be $[0\ 0\ 0 \cdots 1]$. Can anyone guide me to derive a gradient descent based algorithm to achieve this solution.

share|improve this question

migrated from stats.stackexchange.com Dec 15 '11 at 16:52

This question came from our site for people interested in statistics, machine learning, data analysis, data mining, and data visualization.

closed as off topic by Jay Conrod, Karel Petranek, mtrw, Josh Smeaton, Graviton Dec 17 '11 at 8:31

Questions on Stack Overflow are expected to relate to programming within the scope defined by the community. Consider editing the question or leaving comments for improvement if you believe the question can be reworded to fit within the scope. Read more about reopening questions here.If this question can be reworded to fit the rules in the help center, please edit the question.

math.stackexchange.com seems more appropriate for this. –  mtrw Dec 15 '11 at 20:29

2 Answers 2

I would check out the Hastie, Tibshirani book: Elements of Statistical Learning. It's free! This sounds very much like a maximum entropy neural net. The constraints are similar to that of a log linear model, suggesting the use of Lagrange multipliers for an analytic solution. But you also seem interested in a more general activation function than the softmax (logistic). You can reference project pursuit regression which estimates a spline-based activation function.

share|improve this answer

Just to make sure. It is a concave function and you want minimize it (not maximize). First of all, there is a chance that you fall into local mimina b.c you are mimizing a concave function. Anyway, one of the approach is to use spectral gradient projection(SPG). Why? because you have a feasible set (ie. c_i >= 0 \sum c_i = 1) and you need to project your gradient step on the feasible set to stay feasible (ie inside of the set). If you are familiar with R, there is a nice package which does that for you. for SPG you need to provide gradient of your cost function and a projection function that map any to your feasible set. Computing gradient must be easy in your case. To find out how to write a projection algorithm (specifically for your feasible set) check out:


and look for projection on simplex (this is what your feasible set is called)

share|improve this answer

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