# How to get strongest path prolog?

I'm trying to create a social graph and I have to write some Prolog in order to get the minimal and the strongest path.

My knowledge base only has the following statements:

edge(source, destination, weight)

example: (john, mary, 2).

The weights can only be 3 for now:

1 - Friend 2- Close friend 3 - Family

Here is my code to the minimal path (less weighted).

``````findapath(X, Y, W, [X,Y], _) :- edge(X, Y, W).
findapath(X, Y, W, [X|P], V) :- \+ member(X, V),
edge(X, Z, W1),
findapath(Z, Y, W2, P, [X|V]),
W is W1 + W2.

:-dynamic(solution/2).
findminpath(X, Y, W, P) :- \+ solution(_, _),
findapath(X, Y, W1, P1, []),
assertz(solution(W1, P1)),
!,
findminpath(X,Y,W,P).

findminpath(X, Y, _, _) :- findapath(X, Y, W1, P1, []),
solution(W2, P2),
W1 < W2,
retract(solution(W2, P2)),
asserta(solution(W1, P1)),
fail.

findminpath(_, _, W, P) :- solution(W,P), retract(solution(W,P)).
``````

How to include a variable to count the number of paths traveled and then use that to get the strongest path?

The strongest path is path weight / number of paths traveled.

So for example,

Weight = 8 N Paths traveled = 3

8/3 = 2.67 strength

Which means that there are 3 people between me and my destination (this is a social graph) and their weighted sum is 8.

But in this case

Weight = 7 N Paths traveled = 7

This would be the minimal path instead, right? YES, because it's 7 and 7 < 8. However, it is NOT the strongest path because 7/7 = 1 and that means that I probably had loads of people between me and my destination that weren't as close to me as the other path.

How would I do this?

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using assert/retract to do inferences is bad design, try to avoid it... –  CapelliC Dec 27 '12 at 15:46

## 1 Answer

If your Prolog system has `keysort/2` and `findall/3`, you can avoid assertz/retract. Namely you can first define strength based on weight how I understand it:

``````% path_list_and_weight(+Node,+Node,-Nodes,-Integer)
path_list_and_weight(...) :- ...

% path_list_and_neg_strength(+Node,+Node,-Nodes,-Float)
path_list_and_neg_strength(X, Y, L, S) :-
path_list_and_weight(X, Y, L, W),
length(L, N),
S is -W/N.
``````

And then enumerate all path lists with their strength, and keysort it. I have defined strength as a negative value, so that keysort gives me the highest strength:

``````% max_path_list_and_strength(+Node,+Node,-Nodes,-Float)
max_path_list_and_strength(X, Y, L, S) :-
findall(T-M, path_list_and_neg_strength(X, Y, T, M), H),
keysort(H, [J-L|_]),
S is -J.
``````

I guess the above will not work in practice for some graphs, when there is a combinatorial explosion, and `path_list_and_neg_strength/4` will have too many redos. In this case maybe a tabling based solution is better.

Bye

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