I am new in Prolog and I am studying it for an universitary exam, we use SWI Prolog
I have some problem to understand how work this simple program that say TRUE if a list S is a sublist of a list L, otherwise say that the predicate is FALSE.
I have the following solution but I have some problem to understand it's declarative meaning
Reading the book I think that I had have some idea but I am not sure about it...
This is the solution that use concatenation:
sublist(S,L) :- conc(L1, L2, L), conc(S, L3, L2). conc(,L,L). conc([X|L1],L2,[X|L3]) :- conc(L1,L2,L3).
This solution use an other litle program that respond TRUE if the third list is the concatenation of the first and the second list.
To say if S i sublist of L have to be TRUE the following two conditions:
- L have to be a list that is the concatenation of L1 and L2
- L2 have to be a list that is the concatenation of S (my sublist if exist into L list) and another list L3
This is the book explaination but it is just a litle obsucre for me...
I have try to reasoning about it and try to understand what really deeply mean...
So I think that, in some way, it is like to search if an element is member of a list using this other program:
member2(X, [X|_]). member2(X,[_|T]):- member2(X,T).
In this program I simply say that if X is the element in the top of the list (its head) then X is in the list and the program respond true. Otherwise, if X element is not in the top of the list (or it is not my solution) I try to search it it the TAIL T of this list.
Back to the sublist program I think that the reasoning is similar
First I decompose L list in two list L1 and L2 (using conc program)**
Then I check if it is true that the concatenation of S and L3 is the L2 list.
If booth these condition it is true then S is sublist of L
I think that the L1 list have a similar role of the X element that I extract from the list in the member program.
Since the sublist S can start at the beginning of the list L, L1 can be  and I have that I can decompose L in the concatenation of L1= and L2 and the I can try to decompose L2 in S and L3.
If I can do this last decomposition then the program end and I can say that it is true that S is a sublist of the original list L
If it is not true that conc(S, L3, L2) then ddo backtrack and take an other branch of computation
Is it right my declarative interpretation?
I am finding great difficulties with this example, I have also try to find a procedural explaination (using the operation trace in the Prolog shell) but I have big problem because the computation it is so big also for a short list...