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Building an Expression Tree in Prolog

I'm looking for a way to build an Expression Tree in Prolog. I already did some experiments and came up with the following working code (that will only handle constants and the plus expression):

const(_).
plus(_, _).

eval(const(R), R).

eval(plus(A, B), R) :- number(A), number(B), R is A+B.
eval(plus(A, B), R) :- number(A), eval(B, B_R), R is A+B_R.
eval(plus(A, B), R) :- eval(A, A_R), number(B), R is A_R+B.
eval(plus(A, B), R) :- eval(A, A_R), eval(B, B_R), R is A_R+B_R.

Is there any simpler alternative to this approach? Will I have to define these 4 cases for each one of the operators I plan on adding to my program?

like image 354
devoured elysium Avatar asked Oct 19 '11 21:10

devoured elysium


1 Answers

See here another schema, exploiting DCG and (a kind of) lazy evaluation:

/*
File:    dcg_calculator.pl
Author:  Carlo,,,
Created: Aug 16 2011
Purpose: associativity and precedences in calculator
*/

:- module(dcg_calculator, [dcg_calculator/2, expr//1]).
%- [library(http/dcg_basics)]. obsolete
:- [library(dcg/basics)].

/* usage

?- dcg_calculator("1+(-2-2)",S),V is S.
S = 1+ (-2-2),
V = -3 ;
false.

*/
dcg_calculator(Formula, IsEvaluable) :-
    phrase(expr(IsEvaluable), Formula, []).

expr(Evaluable) -->
    sum(Evaluable).

sum(S) -->
    product(P), sum_1(P, S).
sum_1(L, S) -->
    "+", product(P), sum_1(L + P, S);
    "-", product(P), sum_1(L - P, S);
    {L = S}.

product(P) -->
    value(V), product_1(V, P).
product_1(V, P) -->
    "*", value(U), product_1(V * U, P);
    "/", value(U), product_1(V / U, P);
    {V = P}.

% value(V) -->
%   {var(V)} -> {V=0 /* between(0, 9, V)*/ }, "0".

value(V) -->
    "(", expr(V), ")" ;
    number(V).

Using grammars to model data structures it's a very useful technique in Prolog. The grammar used it's an implementation of PEGs. Dependency from SWI-Prolog it's very limited, just number//1.

like image 176
CapelliC Avatar answered Sep 22 '22 21:09

CapelliC