I'm trying to find an algorithm to sort a group of students into small groups based on preferences. Each student selects three students they want to work with and three students they don't want to work with. The rest are assumed to be "could work with if necessary."

What's the best way to find the combination of students that best matches their preferences?

littlebias given by a "preference" sounds like a much better idea to me. (Also, being pedantic, choosing 3 others to work with results in groups of 4, not 3). – Damon Nov 12 '12 at 17:04`k`

groups" and without restriction on the number of "dislikes" is NP-Hard and reduceable from the graph-coloring problem, which is NP-Hard, by the simple reduction: Each edge is a "dislike" - find`k`

groups, each generated group in the solution is a color in the graph coloring. – amit Nov 12 '12 at 20:14