# Allocating numbers (x1, x2, x3, …) to each element in a list (a1, a2, a3, …) so that a1/x1 is similar to a2/x2 and so on

Suppose I have a list of numbers = [3, 10, 20, 1, ...] How can I assign a number (x1, x2, x3, x4, ...) to each of the elements in the list, so that 3/x1 ~= 10/x2 ~= 20/x3 ~= 1/x4 = ... ?

Edit: there are some restrictions on the numbers (x1, x2, x3...). they have to be picked from a list of available numbers (which can be floating points as well). The problem is that the number of elements is not the same. There are more X elements. Xs can be assigned multiple times.

The goal is to minimize the difference between 3/x1, 10/x2, 20/x3, 1/x4

• Do you want your x-values to be (positive) integer numbers? Or are real numbers (floating point) also acceptable? – 0 0 Jun 13 at 14:57
• You can set `x1` to `1`, and then the other x-values should follow automatically from a basic calculation. – 0 0 Jun 13 at 14:59
• sorry, I forgot to say that there are some restrictions on the numbers (x1, x2, x3...). they have to be picked from a list of available numbers. Please see the edit – Teresa Salazar Jun 13 at 15:10
• Floating points are acceptable – Teresa Salazar Jun 13 at 15:11
• And can the `x`s be used multiple times? You are adding more and more information in the comments. Please edit your question instead. Also, what is the average min distance? From the set of quotients, you can either retrieve the minimum or the average. But not both at the same time. – Nico Schertler Jun 13 at 15:37

It often helps to develop a mathematical model. E.g.

Let

``````   a(i)>=0  i=1,..,m
b(j)>0   j=1,..,n with n > m
``````

be the data.

Introduce variables (to be determined by the model)

``````   c      =  common number for all expressions to be close to
x(i,j) =  1 if a(i) is assigned to b(j)
0 otherwise
``````

Then we can write:

``````min sum((i,j), (x(i,j)*(a(i)/b(j) - c))^2 )
subject to
sum(j, x(i,j)) = 1   for all i  (each a(i) is assigned to exactly one b(j))
x(i,j) in {0,1}
c free
``````

This is a non-linear model. MINLP (Mixed Integer Non-linear Programming) solvers are readily available. You can also choose an objective that can be linearized:

``````min sum((i,j), abs(x(i,j)*(a(i)/b(j) - y(i,j))) )
subject to
y(i,j) = x(i,j)*c
sum(j, x(i,j)) = 1   for all i
x(i,j) in {0,1}
c free
``````

This can be reformulated as a MIP (Mixed Integer Programming) model. There are many MIP solvers available.

The solution can look like:

The values inside the matrix are a(i)/b(j). Each row corresponds to an a(i), and has exactly one matching b(j).

More details are here.