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Can someone please explain the Differential Evolution method? The Wikipedia definition is extremely technical.

A dumbed-down explanation followed by a simple example would be appreciated :)

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Here's a simplified description. DE is an optimisation technique which iteratively modifies a population of candidate solutions to make it converge to an optimum of your function.

You first initialise your candidate solutions randomly. Then at each iteration and for each candidate solution x you do the following:

  1. you produce a trial vector: v = a + ( b - c ) / 2, where a, b, c are three distinct candidate solutions picked randomly among your population.
  2. you randomly swap vector components between x and v to produce v'. At least one component from v must be swapped.
  3. you replace x in your population with v' only if it is a better candidate (i.e. it better optimise your function).

(Note that the above algorithm is very simplified; don't code from it, find proper spec. elsewhere instead)

Unfortunately the Wikipedia article lacks illustrations. It is easier to understand with a graphical representation, you'll find some in these slides: http://www-personal.une.edu.au/~jvanderw/DE_1.pdf .

It is similar to genetic algorithm (GA) except that the candidate solutions are not considered as binary strings (chromosome) but (usually) as real vectors. One key aspect of DE is that the mutation step size (see step 1 for the mutation) is dynamic, that is, it adapts to the configuration of your population and will tend to zero when it converges. This makes DE less vulnerable to genetic drift than GA.

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Doesn't step 3 make DE susceptible to getting stuck in local maximas? –  Gili Sep 26 '11 at 3:39
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In fact the three steps above correspond to the typical evolutionary operations: mutation, cross-over and selection. Without the selection operation (step 3) your population will never converge at all and the method will remain random. Algorithmic variants of DE have been introduced to increase diversity in the population by tweaking the individual operators. For instance you could inject Gaussian noise to the trial vector (v). –  Bob Roberts Sep 26 '11 at 11:17
    
you are right, with one exception. Step 3 says that x is replaced only if v' is a better candidate. Typical Genetic Algorithms accept worse candidates to avoid getting stuck in local maximas. So my question remains: isn't this a problem? –  Gili Sep 26 '11 at 14:26
    
@BobRoberts can you explain Gaussian noise and it's effect in trial vector? –  oMiD Dec 20 '13 at 10:02
    
If the noise variance in your function is high then conventional DE is known to perform quite badly compared to other algorithms because it is less stochastic and more greedy. For example, one possible way to overcome this problem is to inject noise when creating the trial vector to improve exploration. Instead of dividing by 2 in the first step, you could multiply by a random number between 0.5 and 1 (randomly chosen for each v). See for instance 'Improved Differential Evolution Algorithms for Handling Noisy Optimization Problems' by S. Das, A. Konar, U. Chakraborty (2005). –  Bob Roberts Jan 3 '14 at 11:54

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