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I have this problem containing some inequations and requirement to minimize a value. After doing some research on the Internet, I came to conclusion that using Prolog might be the easiest way to solve it. However, I never used Prolog before, and I would hate to waste my time learning it just to discover that it is not the right tool for this job.

Please, if you know Prolog, take a look at this problem and tell me if Prolog is the right one. Or, if you know of some other language that is really suited for this.

a + b + c >= 100
d + e + f >= 50
g + h     >= 30

if (8b + 2e + 7h > 620) then y = 0.8 else y = 1.0
if (d > 35)             then x = 0.9 else x = 1.0

5xa + 8yb + 5c + 3xd + 2ye + 2f + 6xg + 7yh = w.

I need to find the values for a, b, c, d, e, f, g and h that minimize w.

Please note that the above is only an example. In real program, I would use up to 10000 variables and up to 20 if..then clauses. This rules out linear programming as an alternative technique because it would take a prohibitive amount of RAM and time to test all LP problems.

I'm not really asking for code, although I'd be grateful for some hint how to tackle this if Prolog is really good for it. Thanks.

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up vote 1 down vote accepted

I haven't worked with similar problems before, so I can't give you any direct suggestions. However, I would not use Prolog for it. Prolog is really good for dealing with symbolic problems (a classic example would be the Einstein puzzle), but its math support is very awkward; it feels like math was tacked on as an afterthought.

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Actually, I'm looking into Constraint Logic Programming which is built into almost all Prolog implementations. – Milan Babuškov Mar 19 '10 at 10:12
OTOH, it seems that CLP (and LP methods) are really just an extensions to prolog, and can be used with other languages in the same way, so I guess your answer is the best it can get given the question I asked. So, I'll just accept it. Thanks. – Milan Babuškov Mar 22 '10 at 0:07

You can solve this using linear programming (LP), but the problem needs some modification before you can chuck it into an LP solver. An LP problem basically involves maximising or minimising a function given some constraints.

First, split the problem into two problems (as LP does not support the two if conditions you have):

a + b + c >= 100
d + e + f >= 50
g + h     >= 30
8b + 2e + 7h > 620

Linear function:
5 * 0.8a + 8 * 1.0b + 5c + 3 * 0.8d + 2 * 1.0e + 2f + 6 * 0.8g + 7 * 1.0h = w


a + b + c >= 100
d + e + f >= 50
g + h     >= 30
d > 35

Linear function:
5 * 1.0a + 8 * 0.9b + 5c + 3 * 1.0d + 2 * 0.9e + 2f + 6 * 1.0g + 7 * 0.9h = w

After you run both separately by the LP solver, the solution will come out with the values of a, b, c, d, e, f, g, h and w. Pick the smaller value of w and the corresponding values of a, b, c, d, e, f, g, h.

How does this work?

The two if conditions are effectively similar to the other constraints listed, just that they entail different values of x and y. Since the two conditions are mutually exclusive (given that both cannot be satisfied as x and y will hence have different values), you can split them into two separate LP problems. As a result, you solve the LP problems individually, and hence you will arrive at a minimised value of w.

For an LP solver, go to the linear programming Wikipedia article as linked above. There are tools like Excel and some others which are easier to use, but if you want a program, then there are numerical languages which are good at this, or general purpose languages like C that can do this with a library like glpk.

Hope this helps!

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Thanks, I give you a vote up, but it cannot be done. I already tried using lp_solve, but actual number of variables is not 8, but about 10000, which requires huge matrix and even a single calculation runs too long. The number of if..then clauses can be about 20, so number of combinations of those is also huge. Given that a single problem solving would take too much time, running a solver for each possible combination would be impossible. Also, in the answer you gave, a third LP would be needed for the case when none of IF conditions is satisfied. – Milan Babuškov Mar 19 '10 at 6:51
Ah, I see I see. Fair enough then. But in the answer I gave, it would not make sense to have a third LP as you must satisfy one if condition, as if you don't satisfy either, then what is the value of x and y? – blwy10 Mar 19 '10 at 7:36
Both X and Y would be 1. – Milan Babuškov Mar 19 '10 at 10:08
Ah... Fair enough then... All the best with your problem! Hope you find a good solution soon! – blwy10 Mar 19 '10 at 10:28

You could have a look at Constraint Logic Programming, either CLP(R), CLP(Q) or CLP(FD). Your problem can be encoded into CLP(R) as follows (I think):

:- use_module(library(clpr)).

test(sol([A,B,C,D,E,F,G,H], [X,Y,W])) :-
    {A >=0, B >=0, C>=0, D>=0, E>=0, F>=0, G>=0, H>=0},
    {A + B + C >= 100},
    {D + E + F >= 50},
    {G + H     >= 30},
    {5*X*A + 8*Y*B + 5*C + 3*X*D + 2*Y*E + 2*F + 6*X*G  + 7*Y*H = W},
    (({8*B + 2*E + 7*H > 620},{Y=0.8}) ; ({8*B + 2*E + 7*H =35},{X=0.9}) ; ({D=

Using SICStus Prolog, I get the following answer:

| ?- test(A). A = sol([_A,0.0,_B,0.0,_C,_D,30.0,0.0],[1.0,1.0,780.0]), {_A=100.0-_B}, {_C=50.0-_D}, {_B==0.0}, {_D>=0.0} ? ; no
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