# A combination of a list given a length followed by a permutation in Prolog?

I need a predicate to return a list with all combinations of the input list, and the list result size is in the second param, the predicate would be like this

``````permutInListN( +inputList, +lengthListResult, -ListResult),
``````

example:

``````permutInListN([1,2,3],2,L).
? L=[1,2].
? L=[2,1].
? L=[1,3].
? L=[3,1].
? L=[2,3].
? L=[3,2].
``````

Combinations of `[1,2,3]` in a list `L` with length `2`. with no repetitions maybe using setoff.

this is my code but it doesn't work at all , no generate all solutions

``````permutInListN(_, 0, []).
permutInListN([X|Xs], N, [X|Ys]) :- N1 is N-1, permutInListN(Xs,N1,Ys).
permutInListN([_|Xs], N, Y) :- N>0, permutInListN(Xs,N,Y).

?permutInListN([1,2,3],2,L).
L = [1, 2]
L = [1, 3]
L = [2, 3]
``````

What you want is a combination followed by a permutation.

For combination:

``````comb(0,_,[]).

comb(N,[X|T],[X|Comb]) :-
N>0,
N1 is N-1,
comb(N1,T,Comb).

comb(N,[_|T],Comb) :-
N>0,
comb(N,T,Comb).
``````

Example:

``````?- comb(2,[1,2,3],List).
List = [1, 2] ;
List = [1, 3] ;
List = [2, 3] ;
false.
``````

For Permutation just use SWI-Prolog `permutation/2` in library lists

``````:- use_module(library(lists)).

?- permutation([1,2],R).
R = [1, 2] ;
R = [2, 1] ;
false.
``````

Putting them together

``````comb_perm(N,List,Result) :-
comb(N,List,Comb),
permutation(Comb,Result).
``````

``````?- comb_perm(2,[1,2,3],R).
R = [1, 2] ;
R = [2, 1] ;
R = [1, 3] ;
R = [3, 1] ;
R = [2, 3] ;
R = [3, 2] ;
false.
``````

``````permutInListN(List,N,Result) :-
comb(N,List,Comb),
permutation(Comb,Result).
``````

Example

``````?- permutInListN([1,2,3],2,R).
R = [1, 2] ;
R = [2, 1] ;
R = [1, 3] ;
R = [3, 1] ;
R = [2, 3] ;
R = [3, 2] ;
false.
``````
• The `permutation/2` predicate in SWI-Prolog is a library predicate, not a built-in predicate. – Paulo Moura Dec 7 at 13:56
• @PauloMoura Thanks. – Guy Coder Dec 7 at 14:07
• thanks @GuyCoder , it helps me a lot! – guilieen Dec 7 at 15:11

# Permutating the result

Your `permutInListN/3` predicate basically takes `N` elements in an ordered way from the given list, but the order of the elements that are picked, is the same as the original order.

We can thus post-process this list, by finding all permutations of the selected elements, so something like:

``````permutInListN(L, N, R) :-
takeN(L, N, S),
permutation(S, R).``````

with `takeN/3` almost equivalent to the predicate you defined:

``````takeN(_, 0, []).
takeN([X|Xs], N, [X|Ys]) :-
N > 0,
N1 is N-1,
takeN(Xs,N1,Ys).
takeN([_|Xs], N, Y) :-
N > 0,
takeN(Xs,N,Y).``````

`permutation/3` [swi-doc] is a predicate from the `lists` library [swi-doc].

# Using N`select/3`s

We can also solve the problem by `N` times using the `select/3` predicate [swi-doc]. `select(X, L, R)` takes an element `X` from a list, and `R` is a list, without that element. We can thus recursively pass the list and each time remove an element, until we removed `N` elements, like:

``````permutInListN(_, 0, []).
permutInListN(L, N, [X|T]) :-
N > 0,
N1 is N-1,
select(X, L, R),
permutInListN(R, N1, T).``````