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Let's say I have a set of training examples where A_i is an attribute and the outcome is binary (yes or no):

A1,             A2,             A3,             Outcome
red             dark            large           yes
green           dark            small           yes
orange          bright          large           no

I know I have to define the fitness function, what is it for this problem? In my actual problem there are 10 paramaters and 100 training examples but this is a similar problem.

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I give 5 dollars to everyone who has understood what the actual problem is. – Spyros Apr 17 '11 at 11:38
@SpyrosP, I'll send you my paypal information ;). I understand what he's asking, although I don't have an answer...yet – Prescott Apr 17 '11 at 11:40
Consider A1, A2, A3 to be observed variables. Observing those varaibles you also see that they have a particular outcome. A1 = color of some guys car, A2 = the sky dark or light, A3 = is he driving a large or small car. Now assume that all your data is from car crashes, and your outcome is "Did the guy need to goto the hospital as a result of his crash". Using the input, and the outcome, you try to build a function (model) to predict in the future if the guy needs to goto the hospital or not if he crashes. This is quite contrived, but should help you to understand – Prescott Apr 17 '11 at 11:46
@SpyrosP - OP wants to generate a program, that takes i parameters [A_1 - A_i] and returns either yes or no. – Ishtar Apr 17 '11 at 11:48
@SpyrosP am I getting those 5 bucks? ;) – JohnIdol Apr 17 '11 at 21:18

1 Answer 1

up vote 5 down vote accepted

I think the confusion here is coming from the fact that usually fitness functions give you back some scalar, sometimes on a discrete scale, but never a binary yes/no (or true/false). In this sense, this looks more like a 'classification' problem to be solved with neural nets (or possibly bayesian logic). Said so, you could certainly devise a GA to evolve whatever kind of classifier, and the fitness function would basically be expressed in terms of correct classifications over total evaluations.

Another pure GA approach to this - probably more relevant to the question - is to encode the whole classification rule set as a given individual for the genetic algorithm. In this sense, the fitness function could be expressed as a scalar representing how many yes/no classifications the given candidate solution at hand gets right over the total, and so forth. A similar approach can be found in this paper Using Real-Valued Genetic: Algorithms to Evolve R,de Sets for Classification.

Example (one of the possible ways to encode this):

A1,             A2,             A3,             Outcome
red             dark            large           yes
green           dark            small           yes
orange          bright          large           no

Encoding: red = 000, dark = 001, large = 010, green = 011, small = 100, orange = 101, bright = 111, etc. Outcome: yes = 1, no = 0


A1,             A2,             A3,             Outcome
000             001             010             1
011             001             100             1
101             111             010             0

All of the above gets translated into a candidate solution as:


You will generate a random bunch of these and evolve them whichever way you like by testing fitness (correct classification/ total classifications in the ruleset) of the entire rule set (be careful picking your cross-over strategy here!).

I also suggest you listen to a binary solo, to get you in the mood.

NOTE: I highly doubt this would work with a rule-set composed by only 3 rules, not enough breadth for the GA.

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@JohnIdol Thanks for the answer. If I choose a chromosome design which made the three examples be 100101010, 010100110, 001010101 respectively (so the first example is 100 because the first attribute is red followed by 10 because the second attribute is dark followed by 10 because the third attribute is large followed by 10 because it was a 'yes' example) then do you think you could come up with the fitness function applied to one of the examples so I can see what you mean better? I'll have a look at this paper too. +1 for this thank you :). – ale Apr 17 '11 at 15:10
Slight correction: The fitness function applied to a initialised random hypothesis. I could make one up: 010101010. – ale Apr 17 '11 at 15:21
I edited the answer with an example. Yes, you would generate a a bunch of random binary strings to start with and feed them to the GA. Hope this helps! – JohnIdol Apr 17 '11 at 15:39
I find the binary solo to be quite inspirational :) – JohnIdol Apr 17 '11 at 21:18
The GA scheme can perhaps work for vivid's problem. However, looking at rules based on all possible combinations of attributes mean's searching through a hypothesis space comprised of all hypothesis. Thus, the only bias in the learner is that introduced via the crossover/mutation operators, which may be unnatural and may not lead to good generalization. To help, introduce more bias by considering a restricted (parameterized) set of rules based on your domain knowledge of the problem. E.g. rules made up of ranges/cutoff values or pairs of attributes (differences of) and evolve those parameters – Junier Apr 20 '11 at 7:16

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