Parallel many dimensional optimization

I am building a script that generates input data [parameters] for another program to calculate. I would like to optimize the resulting data. Previously I have been using the numpy powell optimization. The psuedo code looks something like this.

``````def value(param):
run_program(param)
#Parse output
return value

scipy.optimize.fmin_powell(value,param)
``````

This works great; however, it is incredibly slow as each iteration of the program can take days to run. What I would like to do is coarse grain parallelize this. So instead of running a single iteration at a time it would run (number of parameters)*2 at a time. For example:

``````Initial guess: param=[1,2,3,4,5]

#Modify guess by plus minus another matrix that is changeable at each iteration
jump=[1,1,1,1,1]
#Modify each variable plus/minus jump.
for num,a in enumerate(param):
new_param1=param[:]
new_param1[num]=new_param1[num]+jump[num]
run_program(new_param1)
new_param2=param[:]
new_param2[num]=new_param2[num]-jump[num]
run_program(new_param2)

#Wait until all programs are complete -> Parse Output
Output=[[value,param],...]
#Create new guess
#Repeat
``````

Number of variable can range from 3-12 so something such as this could potentially speed up the code from taking a year down to a week. All variables are dependent on each other and I am only looking for local minima from the initial guess. I have started an implementation using hessian matrices; however, that is quite involved. Is there anything out there that either does this, is there a simpler way, or any suggestions to get started?

So the primary question is the following: Is there an algorithm that takes a starting guess, generates multiple guesses, then uses those multiple guesses to create a new guess, and repeats until a threshold is found. Only analytic derivatives are available. What is a good way of going about this, is there something built already that does this, is there other options?

As a small update I do have this working by calculating simple parabolas through the three points of each dimension and then using the minima as the next guess. This seems to work decently, but is not optimal. I am still looking for additional options.

Current best implementation is parallelizing the inner loop of powell's method.

Thank you everyone for your comments. Unfortunately it looks like there is simply not a concise answer to this particular problem. If I get around to implementing something that does this I will paste it here; however, as the project is not particularly important or the need of results pressing I will likely be content letting it take up a node for awhile.

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This is not directly related to your question; but as your task is this resource-intensive, wouldn't it make more sense to use a compiled language like C for performance benefits? –  anroesti Dec 7 '12 at 5:25
@Ophion You might want get your code reviewed first. Also consider these performance tips. wiki.python.org/moin/PythonSpeed/PerformanceTips –  Larry Battle Dec 7 '12 at 5:37
The primary code is in C and highly optimized, and unfortunately implementations to parallelize it across multiple compute nodes are not particularly effective. I need something to interface with the primary code and optimize a set of parameters that it was not designed to do. Recoding the primary to do this is an option, but likely more complicated and ultimately to little benefit. –  Ophion Dec 7 '12 at 15:20
So what exactly do you want to have parallel? What does run_program() do? If it is not messing with any variables, you could easily use a pool and its map function (docs.python.org/2/library/…) –  Karsten Dec 7 '12 at 15:44
run_program(param) executes the primary code with the imput parameters and returns a singular value. Essentially what I want to do is have a parallel version of the powell's algorithm or some other minimization algorithm that preferably does not require derivatives and can take multiple simultaneous guesses into account. –  Ophion Dec 7 '12 at 15:52

I had the same problem while I was in the university, we had a fortran algorithm to calculate the efficiency of an engine based on a group of variables. At the time we use modeFRONTIER and if I recall correctly, none of the algorithms were able to generate multiple guesses.

The normal approach would be to have a DOE and there where some algorithms to generate the DOE to best fit your problem. After that we would run the single DOE entries parallely and an algorithm would "watch" the development of the optimizations showing the current best design.

Side note: If you don't have a cluster and needs more computing power HTCondor may help you.

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Hello, I am glad to hear of others with similar problems. Thank you for introducing me to modeFRONTIER, it looks like a very interesting software package. Something that watches various optimizations could be interesting - I will look into it. I fortunately have a cluster that more than meets my computing needs; however, its looking like for this particular project buying a small linux box and shoving it under a desk for a year is looking like the best way of going about this. –  Ophion Dec 14 '12 at 20:17

I think what you want to do is use the threading capabilities built-in python. Provided you your working function has more or less the same run-time whatever the params, it would be efficient.

Create 8 threads in a pool, run 8 instances of your function, get 8 result, run your optimisation algo to change the params with 8 results, repeat.... profit ?

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The issue is the optimization algorithm. I will rewrite the main text to make it clear. The primary question is: Is there a minimization algorithm already built that takes multiple inputs and can create multiple guesses to obtain the value of? –  Ophion Dec 8 '12 at 16:09
can't you make an asynchronous process that run your optimisation function for one results every time a thread finishes a work ? Because the implementation you want to make will only be better than this if your working function has a very similar computing time whatever the parameters. –  Félix Cantournet Dec 8 '12 at 19:32
Work function computation time variation is on the order of several percent. Asynchronous process would be a more advanced step, I need to obtain a better minimization algorithm first. –  Ophion Dec 8 '12 at 19:46

Are derivatives of your goal function available? If yes, you can use gradient descent (old, slow but reliable) or conjugate gradient. If not, you can approximate the derivatives using finite differences and still use these methods. I think in general, if using finite difference approximations to the derivatives, you are much better off using conjugate gradients rather than Newton's method.

A more modern method is SPSA which is a stochastic method and doesn't require derivatives. SPSA requires much fewer evaluations of the goal function for the same rate of convergence than the finite difference approximation to conjugate gradients, for somewhat well-behaved problems.

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Analytic derivatives are available, but questionable. Conjugate Gradient methods work really well for this type of work. My current implementation is a Powell's where the inner loop is parallelized. SPSA is really great, but not really what I am looking for here. Really the primary issue comes down to how to parallelize the minimization algorithm. –  Ophion Dec 10 '12 at 16:39

There are two ways of estimating gradients, one easily parallelizable, one not:

• around a single point, e.g. (f( x + h directioni ) - f(x)) / h; this is easily parallelizable up to Ndim
• "walking" gradient: walk from x0 in direction e0 to x1, then from x1 in direction e1 to x2 ...; this is sequential.

Minimizers that use gradients are highly developed, powerful, converge quadratically (on smooth enough functions). The user-supplied gradient function can of course be a parallel-gradient-estimator.
A few minimizers use "walking" gradients, among them Powell's method, see Numerical Recipes p. 509.
So I'm confused: how do you parallelize its inner loop ?

I'd suggest scipy fmin_tnc with a parallel-gradient-estimator, maybe using central, not one-sided, differences.
(Fwiw, this compares some of the scipy no-derivative optimizers on two 10-d functions; ymmv.)

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The is interesting I skipped over it when I was looking through the list of implemented functions, it would heavily depend on the gradients produced. I will give it a shot using the parabolic analytic derivatives. Numerical Recipes is a great book! For the Powell's Method you can find the minima of a dimension using other methods that can be parallelized. Still looking for something already implemented for point one if possible. –  Ophion Dec 11 '12 at 18:21

If I haven't gotten wrong what you are asking, you are trying to minimize your function one parameter at the time.

you can obtain it by creating a set of function of a single argument, where for each function you freeze all the arguments except one.

Then you go on a loop optimizing each variable and updating the partial solution.

This method can speed up by a great deal function of many parameters where the energy landscape is not too complex (the dependency between the parameters is not too strong).

given a function

``````energy(*args) -> value
``````

you create the guess and the function:

``````guess = [1,1,1,1]
funcs = [ lambda x,i=i: energy( guess[:i]+[x]+guess[i+1:] ) for i in range(len(guess)) ]
``````

than you put them in a while cycle for the optimization

``````while convergence_condition:
for func in funcs:
optimize fot func
update the guess
check for convergence
``````

This is a very simple yet effective method of simplify your minimization task. I can't really recall how this method is called, but A close look to the wikipedia entry on minimization should do the trick.

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Yes this would be very easy if all variables were not dependent on each other. –  Ophion Dec 10 '12 at 16:21
The method is useful because it works even on dependent variables, it just need more than one iteration for the convergence. –  EnricoGiampieri Dec 10 '12 at 17:50
You are correct in this; however, it is not an improvement over my current implementation. I will state again what I am really looking for is a way to parallelize a minimization algorithm, not piecewise one together. To restate a good example. Powell's algorithm uses two loops, if you parallelize the inner loop you can speed up the outer loop and thus the entire algorithm. –  Ophion Dec 10 '12 at 18:11