smallest "scrabble board" containing every word of a list

Question

I am looking for an algorithm able to build an array (2D) of letters from which I could extract each word of a given list. Like in Scrabble, words can cross each other, and be horizontal, vertical or diagonal. Of course there are some obvious solutions, but the goal here is to make it as small as possible, which also means maximizing the number of crossing.

I have thought of a machine learning method using a large set of scrabble grids, either made by humans or computers, but I am sure there is a cleaner way of doing it.

Thanks for your help.

PS: that is for an art project, no kidding.

Answer 1

That would be quite some algorithm. I suspect the solution will involve some sort of recursion.

Let's say you have a grid G0 to start with, with all squares blank, and that f(G0) is the optimised completed grid.

Then I would try:

For each possible position of the first word - set G1 = the grid with this word in this position and all other squares blank - work out G1 Go on to next position

To work out G1, you could call f(G1) recursively.

If you had a large grid and a lot of words, this would take forever to run, as it's a wasteful algorithm, but with a typical Scrabble board I should think it would be quick enough on a laptop.