# Prolog: find all numbers of unique digits that can be formed from a list of digits

The best thing I could come up with so far is this function:

`````` numberFromList([X], X) :-
digit(X), !.
numberFromList(List, N) :-
member(X, List),
delete(List, X, LX),
numberFromList(LX, NX),
N is NX * 10 + X.
``````

where `digit/1` is a function verifying if an atom is a decimal digit.

The `numberFromList(List, N)` finds all the numbers that can be formed with all digits from `List`.
E.g. `[2, 3] -> 23, 32`. but I want to get this result: `[2, 3] -> 2, 3, 23, 32`

I spent a lot of hours thinking about this and I suspect you might use something like `append(L, _, List)` at some point to get lists of lesser length.

I would appreciate any contribution.

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How do you want the numbers? In a list or one at a time on backtracking? – rvirding May 26 '10 at 22:49

You are missing case when you skip digit from list.

`````` numberFromList([X], X) :-
digit(X), !.
numberFromList(List, N) :-
member(X, List),
delete(List, X, LX),
numberFromList(LX, NX),
( % use X
N is NX * 10 + X
; % skip X
N = NX
).
``````

BTW, as @Roland Illig mentioned there is `select(X, List, LX)` to replace `member(X, List), delete(List, X, LX)`

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Here's one way, using SWI-PROLOG built-ins for `atomic_list_concat/2`, `atom_number/2` and `select/3`. Firstly, the entry point refers to an implementation using an initially empty accumulator:

``````numberFromList(L, N) :-
numberFromList(L, [], N).
``````

The predicate `numberFromList/3` either accumulates digits (unchecked) from the list, or not, leaving choicepoints:

``````numberFromList([_|Cs], Acc, N) :-
numberFromList(Cs, Acc, N).
numberFromList([C|Cs], Acc, N) :-
numberFromList(Cs, [C|Acc], N).
``````

The final clause of `numberFromList/3` permutes the accumulated list of digits and concatenates them into an atom, which is then converted to a number as required:

``````numberFromList([], [C|Cs], N) :-
permute([C|Cs], PermutedAcc),
atomic_list_concat(PermutedAcc, AN),
atom_number(AN, N).
``````

Sometimes `permute/2` (as defined manually below) may be available as a built-in, such as `permutation/2`. Here is a manual definition using `select/3`:

``````permute([], []).
permute([E|Es], [E0|PL]) :-
select(E0, [E|Es], Rem),
permute(Rem, PL).
``````

If you want a list of all the results and don't want `numberFromList/2` to backtrack itself, you could wrap the call to `numberFromList/3` (with the empty accumulator in the first clause of `numberFromList/2`) in a `findall/3` call.

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The predicate `unique/3` generates all lists of length up to `MaxLen` consisting of symbols from `Symbols`. The generated lists are stored in `L`, once at a time.

``````unique(MaxLen, Symbols, L) :-
between(0, MaxLen, Len),
length(L, Len),
unique(Symbols, L).
``````

The helper predicate for generating the lists.

``````unique(_, []).
unique(Set, [H|R]) :-
select(H, Set, ReducedSet),
unique(ReducedSet, R).
``````

A simple program for demonstrating the above predicate:

``````main :-
unique(5, [2,3], L),
write(L), nl, fail.
``````
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