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I'm not 100% sure what the invariant in a triple power summation is.

Note: n is always a non-negative value.


    while i <= n LI1
        j = 0
        while j < i LI2
            k = 0
            while k < i LI3
                tot = tot + i

I know its messy and could be done in a much easier way, but this is what I am expected to do (mainly for algorithm analysis practice).

I am to come up with three loop invariants; LI1, LI2, and LI3.
I'm thinking that for LI1 the invariant has something to do with tot=(i^2(i+1)^2)/4 (the equation for a sum a cubes from 0 to i)
I don't know what to do for LI2 or LI3 though. The loop at LI2 make i^3 and LI3 makes i^2, but I'm not totally sure how to define them as loop invariants.

Would the invariants be easier to define if I had 3 separate total variables in each of the while loop bodies that added to a main total right before i++ in the first loop?

Thanks for any help you can give.

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1 Answer 1

up vote 1 down vote accepted

I think you can define them as below:

LI1 <= (i^2(i+1)^2)/4
LI2 <= (i+1)^3 + (i^2(i+1)^2)/4
LI3 <= (i+1)^2 + i^3 + (i^2(i+1)^2)/4

(if your calculated amounts is right).

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Thanks! I was working in on it last night and something like that came across my mind, but I wasn't totally sure how to define it. Thanks for the help. For LI2 and LI3, wouldn't all the i's be changed to (i-1)'s? –  Michael Schilling Feb 11 '12 at 21:06
@MichaelSchilling, Loop invariant should be true during execution of loop and also after execution of loop finished, So I think what I said is true. (may be I'm wrong). –  Saeed Amiri Feb 12 '12 at 12:08

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