I need an algorithm to group people in tables based on their preference. Each person vote sorting the tables from the favorite to the worse. For example if there are 4 tables in total one person vote is like:

Alice{ table1 => 2, table2 => 4, table3=>1, table4=>3}

which means she would like to be put on table3 and really dislikes table2

The conditions are:

  • Everyone must be in a group
  • All groups must have the same number of people (tollerance of 1)
  • Maximize the global 'happiness'

Trying to sort this out I defined happiness as points, each person will have happiness 10 if they will be put on their favorite table, 6 on their second choice, 4 on the third and 1 on the last.

happiness[10, 6, 4, 1]

The global happiness is the sum of each person's happiness.

  • why am i getting downvotes? If anyone see a similar question please point me to that – Riccardo Sep 11 '17 at 16:49

One way to solve this is to use integer linear programming. There are many solvers out there for ILP, for example SCIP (http://scip.zib.de/).

You would have binary variable for each assigment, i.e. xij = 1 if person i was assigned to table j (and 0 is it was not assigned).

Your goal is to maximize total happiness, i.e. sum of weights multiplied by xij

Now you have write some conditions to ensure, that:

  • each person is assigned to exactly one table, i.e. sum of xij for each i is equal to one.
  • all tables have similar number of persons (you can determine possible ranges for number of persons beforehand), i.e. some of xij for each j is in defined range.

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