**Representation:**

You have 24 elements, I will name this elements from A to X (24 first letters).
Each of these elements will have a place in one of the 4 graphs. I will assign a number to the 24 nodes of the 4 graphs from 1 to 24.

I will identify the position of A by a 24-uple =(xA1,xA2...,xA24), and if I want to assign A to the node number 8 for exemple, I will write (xa1,Xa2..xa24) = (0,0,0,0,0,0,0,1,0,0...0), where 1 is on position 8.

We can say that A =(xa1,...xa24)

e1...e24 are the unit vectors (1,0...0) to (0,0...1)

note about the operator '.':

There are some constraints on A,...X with these notations :

Xii is in {0,1}
and

Sum(Xai)=1 ... Sum(Xxi)=1

Sum(Xa1,xb1,...Xx1)=1 ... Sum(Xa24,Xb24,... Xx24)=1

Since one element can be assign to only one node.

I will define a graph by defining the neighbors relation of each node, lets say node 8 has neighbors node 7 and node 10

to check that A and B are neighbors on node 8 for exemple I nedd:

A.e8=1 and B.e7 or B.e10 =1 then I just need A.e8*(B.e7+B.e10)==1

in the function isNeighborInGraphs(A,B) I test that for every nodes and I get one or zero depending on the neighborhood.

**Notations:**

- 4 graphs of 6 nodes, the position of each element is defined by an integer from 1 to 24.
(1 to 6 for first graph, etc...)
- e1... e24 are the unit vectors (1,0,0...0) to (0,0...1)
- Let A, B ...X be the N elements.

A=(0,0...,1,...,0)=(xa1,xa2...xa24)

B=...

...

X=(0,0...,1,...,0)

IsNeigborInGraphs(A,B)=A.e1*B.e2+...
//if 1 and 2 are neigbors in one graph
for exemple

L(A)=[B,B,C,E,G...] // list of
neigbors of A (can repeat)

```
actualise(L(A)):
for element in [B,X]
if IsNeigbotInGraphs(A,Element)
L(A).append(Element)
endIf
endfor
```

N(A)=len(L(A))+Sum(IsneigborInGraph(A,i),i in L(A))

...

N(X)= ...

**Description of the algorithm**

- start with an initial position
A=e1... X=e24
- Actualize L(A),L(B)... L(X)
- Solve this (with a solveur, ampl for
exemple will work I guess since it's
a nonlinear optimization
problem):

*Objective function*

min(Sum(N(Z),Z=A to X)

*Constraints:*

Sum(Xai)=1 ... Sum(Xxi)=1

Sum(Xa1,xb1,...Xx1)=1 ...
Sum(Xa24,Xb24,... Xx24)=1

You get the best solution

4.Repeat step 2 and 3, 3 more times.

and4 assignments, but the numbers are effectively unrelated. – Chowlett Jun 6 '11 at 15:22