I want the following to be done in Ocaml but an answer in ex F# could give me enough insight to do the conversion myself.
An ordered power set (from biggest set to the smallest) would make me one step further the problem below which is want I ideally want to be solved.
For a inefficient graph coloring, I need a function which gives me the following:
f({a,b,c,d}):
{{a,b,c,d}}
{{a,b,c},{d}}
{{a,b,d},{c}}
{{a,c,d},{b}}
{{b,c,d},{a}}
{{a,b},{c,d}}
{{a,c},{b,d}}
{{a,d},{b,c}}
{{a},{b,c},{d}}
{{a},{b},{c,d}}
{{a},{b,d},{c}}
...
{{a},{b},{c},{d}}
as a list of sets (or better, as a lazy list/enum of sets)
So I want all variables to be represented in some set. But I want it ordered so I get the one with fewest sets first and the one where all variables is in a set last.
I've one solution which is something like this:
f: Take powerset -> iterate -> apply f on the rest
<- sort the whole list of possibilities
But I would like to avoid sorting an exponential list. And hopefully I can do it with a lazy list so I avoid iterating all possibilities.
{{a,d},{b,c}}
with no ordering in the sets.