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I have the following task:

Write a method that will add two polynoms. I.e 0+2*x^3 and 0+1*x^3+2*x^4 will give 0+3*x^3+2*x^4.

I also wrote the following code:

add_poly(+A1*x^B1+P1,+A2*x^B2+P2,+A3*x^B3+P3):-
    (
       B1=B2,
       B3 = B2,
       A3 is A1+A2,
       add_poly(P1,P2,P3)
    ;
       B1<B2,
       B3=B1,
       A3=A1,
       add_poly(P1,+A2*x^B2+P2,P3)
    ;
       B1>B2,
       B3=B2,
       A3=A2,
       add_poly(+A1*x^B1+P1,P2,P3)
    ).
add_poly(X+P1,Y+P2,Z+P3):-
    Z is X+Y,
    add_poly(P1,P2,P3).

My problem is that I don't know how to stop. I would like to stop when one the arguments is null and than to append the second argument to the third one. But how can I check that they are null? Thanks.

share|improve this question
up vote 2 down vote accepted

Several remarks:

Try to avoid disjunctions (;)/2 in the beginning. They need special indentation to be readable. And they make reading a single rule more complex — think of all the extra (=)/2 goals you have to write and keep track of.


Then, I am not sure what you can assume about your polynomials. Can you assume they are written in canonical form?


And for your program: Consider the head of your first rule:

add_poly(+A1*x^B1+P1,+A2*x^B2+P2,+A3*x^B3+P3):-

I will generalize away some of the arguments:

add_poly(+A1*x^B1+P1,_,_):-

and some of the subterms:

 add_poly(+_+_,_,_):-

This corresponds to:

add_poly(+(+(_),_),_,_) :-

Not sure you like this.

So this rule applies only to terms starting with a prefix + followed by an infix +. At least your sample data did not contain a prefix +.

Also, please remark that the +-operator is left associative. That means that 1+2+3+4 associates to the left:

?- write_canonical(1+2+3+4).
+(+(+(1,2),3),4)

So if you have a term 0+3*x^3+2*x^4 the first thing you "see" is _+2*x^4. The terms on the left are nested deeper.


For your actual question (how to stop) - you will have to test explicitly that the leftmost subterm is an integer, use integer/1 - or maybe a term (*)/2 (that depends on your assumptions).

share|improve this answer

I assume that polynomials you are speaking of are in 1 variable and with integer exponents.

Here a procedure working on normal polynomial form: a polynomial can be represented as a list (a sum) of factors, where the (integer) exponent is implicitly represented by the position.

:- [library(clpfd)].

add_poly(P1, P2, Sum) :-
    normalize(P1, N1),
    normalize(P2, N2),
    append(N1, N2, Nt),
    aggregate_all(max(L), (member(M, Nt), length(M, L)), LMax),
    maplist(rpad(LMax), Nt, Nn),
    clpfd:transpose(Nn, Tn),
    maplist(sumlist, Tn, NSum),
    denormalize(NSum, Sum).

rpad(LMax, List, ListN) :-
    length(List, L),
    D is LMax - L,
    zeros(D, Z),
    append(List, Z, ListN).

% the hardest part is of course normalization: here a draft

normalize(Ts + T, [N|Ns]) :-
    normalize_fact(T, N),
    normalize(Ts, Ns).
normalize(T, [N]) :-
    normalize_fact(T, N).

% build a list with 0s left before position E
normalize_fact(T, Normal) :-
    fact_exp(T, F, E),
    zeros(E, Zeros),
    nth0(E, Normal, F, Zeros).

zeros(E, Zeros) :-
    length(Zeros, E),
    maplist(copy_term(0), Zeros).

fact_exp(F * x ^ E, F, E).
fact_exp(x ^ E, 1, E).
fact_exp(F * x, F, 1).
fact_exp(F, F, 0).

% TBD...
denormalize(NSum, NSum).

test:

?- add_poly(0+2*x^3, 0+1*x^3+2*x^4, P).
P = [0, 0, 0, 3, 2]

the answer is still in normal form, denormalize/2 should be written...

share|improve this answer
    
Nit: better use use_module(library(clpfd)) or even better use_module(library(clpfd),[]). – false Jul 29 '12 at 5:54
    
... or maybe even better and more intention revealing: use_module(library(clpfd),[transpose/2]). – false Jul 29 '12 at 6:03
    
@false: yes, also because I ended up debugging ugraph:transpose... – CapelliC Jul 29 '12 at 6:33
    
@false: but I get an error using the proposed syntax:import/1: No permission to import clpfd:transpose/2 into user (already imported from ugraphs), thus I'm forced to declare a module... – CapelliC Jul 29 '12 at 6:41
    
The general problem behind is that you have imported ugraphs completely. No? So you should indicate precisely what you want (I know this is tedious ...). But in the particular case it is probably the best to do what SICStus did: rename to transpose_ugraph/2. If SICStus can change, this should not be too difficult for other systems. Ideally such things would be addressed by the Prolog prologue. – false Jul 29 '12 at 6:58

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