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Now I'm making a graduate thesis that will discuss about proving correctness of program for multiplying 2 matrices using Hoare logic. For doing this, I need to generate the invariant for nested loop for this program:

for i = 1:n
    for j = 1:n
        for k = 1:n
            C(i,j) = A(i,k)*B(k,j) + C(i,j);
        end
    end
end

I've tried to find the invariant for inner loop first, but I can't find the true one until now. Is there someone can help me for finding the invariant for above program?

Really thanks in advance.

-Anggha

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What do you have so far ? Is there a similar loop whose invariant you have figured out already ? What aspect of the difference with this algorithm is troubling you ? –  huitseeker May 1 '12 at 11:42
    
I never have similar loop that I've figured out the invariant already. They're like GCD Algo and some other simple loop (like for finding factorial, multiplying number). The difference of this algorithm compare with them is especially it contains array and it also contains nested loop.. I don't know what must I do with the array and (if) I can find the invariant of inner loop, what must I do to get invariant for outer loop? Thanks. –  Anggha Nugraha May 1 '12 at 18:50
    
By the way, is there 2 invariant in there or just one for that program? I guess it will be 2 (for each loop). Am I right? What's the clue for finding those invariant? –  Anggha Nugraha May 1 '12 at 19:22
1  
In the context of the inner loop, you can consider the indexes of the two outer loops (i, j) as constants. Now, you just have 2 terms that depend on the loop index. Compare with the factorial, which also had an accumulation variable and something depending on an index operated upon, and stored into an accumulation variable. Conclude on an invariant for the inner loop. Deduce an invariant for the loop indexed by j, reusing the inner loop invariant. Proceed in the same fashion for the loop indexed by i. –  huitseeker May 1 '12 at 19:24
    
huitseeker: really thanks for your answer. But unfortunately, I'm still confused with your explanation. Can I contact you by email? Maybe it will be clearer. I really need assistance in this topic.. :( Thank you very much. –  Anggha Nugraha May 1 '12 at 20:17

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