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Could someone provide a possible loop invariant for the following simple algorithm:

Input: A[0,...,n-1] and B[0,...,m-1], each might contain repeated elements

Output: the first pair of (i,j) such that A[i] == B[j].


for i <- 0 to n-1
    for j <- 0 to m-1
        if A[i] = B[j] then
           return (i,j)
return null

So far, I've got only one solution that might or might not work:

S = {(i,j) | A[0,...,i-1] and B[0,...,j-1] has no common elements}

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Are the arrays sorted? –  G. Bach Apr 2 '13 at 0:02
What is the "first pair of ..." - the one with the smallest i? The smallest j? The smallest i+j? There is more than one possible ordering of the pairs, so you'll have to specify what that means before you can get an answer... For example, if A[0] == B[m-1], would that be "first" over A[1] == B[1]? –  twalberg Oct 3 '13 at 19:04
@twalberg The loop invariant of the algorithm shown above. I think with the algorithm specified, the first pair should be clear :) –  gongzhitaao Oct 3 '13 at 21:55

1 Answer 1

At the beginning of the qth iteration of the second loop inside the pth iteration of the first loop, A[i] != B[j] for all i = 0...p - 1, j = 0...q - 1.

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basically, your solution is identical to what i've included in my question. Actually this is the only one i've worked out. Theoretically, infinite numbers should be found... –  gongzhitaao Apr 1 '13 at 23:32

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