# Mutation for pipeline network optimization

I'm working on pipeline network optimization, and I'm representing the chromosomes as a string of numbers as following

example

``````chromosome [1] = 3 4 7 2 8 9 6 5
``````

where, each number refers to well and the distance between wells are defined. since, the wells cannot be duplicated for one chromosome. for example

``````chromosome [1]' = 3 4 7 2 7 9 6 5 (not acceptable)
``````

what is the best mutation that can deal with a representation like that? thanks in advance.

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Can the problem be reduced to the problem of finding a minimum spanning tree in a connected graph? –  Andreas May 31 '12 at 18:27

Can't say "best" but one model that I've used for graph-like problems is: For each node (well number), calculate the set of adjacent nodes / wells from the entire population. e.g.,

``````population = [[1,2,3,4], [1,2,3,5], [1,2,3,6], [1,2,6,5], [1,2,6,7]]
1 : [2]         ,   #In the entire population, 1 is always only near 2
2 : [1, 3, 6]   ,   #2 is adjacent to 1, 3, and 6 in various individuals
3 : [2, 4, 5, 6],   #...etc...
4 : [3]         ,
5 : [3, 6]      ,
6 : [3, 2, 5, 7],
7 : [6]
}
choose_from_subset = [1,2,3,4,5,6,7] #At first, entire population
``````

Then create a new individual / network by:

`````` choose_next_individual(adjacencies, choose_from_subset) :
Sort adjacencies by the size of their associated sets
From the choices in choose_from_subset, choose the well with the highest number of adjacent possibilities (e.g., either 3 or 6, both of which have 4 possibilities)
If there is a tie (as there is with 3 and 6), choose among them randomly (let's say "3")
Place the chosen well as the next element of the individual / network ([3])
fewerAdjacencies = Remove the chosen well from the set of adjacencies (see below)
``````

The idea is that nodes with high numbers of adjacencies are ripe for recombination (since the population hasn't converged on, e.g., 1->2), a lower "adjacency count" (but non-zero) implies convergence, and a zero adjacency count is (basically) a mutation.

Just to show a sample run ..

``````#Recurse: After removing "3" from the population
new_graph = [3]
new_choose_from_subset = [2,4,5,6] #from 3 : [2,4,5,6]
1: [2]
2: [1, 6]      ,
4: []          ,
5: [6]         ,
6: [2, 5, 7]   ,
7: [6]
}

#Recurse: "6" has most adjacencies in new_choose_from_subset, so choose and remove
new_graph = [3, 6]
new_choose_from_subset = [2, 5,7]
1: [2]
2: [1]         ,
4: []          ,
5: []          ,
7: []
}

#Recurse: Amongst [2,5,7], 2 has the most adjacencies
new_graph = [3, 6, 2]
new_choose_from_subset = [1]
1: []
4: []          ,
5: []          ,
7: []
]

#new_choose_from_subset contains only 1, so that's your next...
new_graph = [3,6,2,1]
new_choose_from_subset = []
4: []          ,
5: []          ,
7: []
]

#From here on out, you'd be choosing randomly between the rest, so you might end up with:
new_graph = [3, 6, 2, 1, 5, 7, 4]
``````

Sanity-check? `3->6` occurs 1x in original, `6->2` appears 2x, `2->1` appears 5x, `1->5` appears 0, `5->7` appears 0, `7->4` appears 0. So you've preserved the most-common adjacency (2->1) and two other "perhaps significant" adjacencies. Otherwise, you're trying out new adjacencies in the solution space.

UPDATE: Originally I'd forgotten the critical point that when recursing, you choose the most-connected to the just-chosen node. That's critical to preserving high-fitness chains! I've updated the description.

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