# Dynamic Programming - Rod Cutting Problem

In Introduction to Algorithms(CLRS), Cormen et al. talk about solving the Rod-cutting problem as follows(page 369)

``````Extended-Bottom-Up-Cut-Rod(p,n)
let r[0...n] and s[0....n] be new arrays
r[0] = 0
for j = 1 to n
q = -infinity
for i = 1 to j
if q < p[i] + r[j-i] .....(6)
q = p[i] + r[j-i]
s[j] = i
r[j] = q
return r and s
``````

Here `p[i]` is the price of cutting the rod at length i, `r[i]` is the revenue of cutting the rod at length i and `s[i]`, gives us the optimal size for the first piece to cut off.

My question is about the outer loop that iterates j from 1 to n and the inner loop i that goes from 1 to n as well.

On line 6 we are comparing q(the maximum revenue gained so far) with `r[j-i]`, the maximum revenue gained during the previous cut.

When `j = 1 and i = 1`, it seems to be fine but the very next iteration of the inner loop where `j = 1 and i = 2`, won't `r[j-i] be r[1-2] = r[-1]`? I am not sure if the negative index makes sense here. Is that a typo in CLRS or I am missing something here?

I case some of you don't know what the rod-cutting problem is, here's an example.

Thanks

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Here's the key: `for i = 1 to j`

`i` will begin at 1 and increase in value up to but not exceeding the value of `j`.

`i` will never be greater than `j`, thus `j-i` will never be less than zero.

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Code labs - Yup! A stupid oversight. Thanks for pointing that out. – sc_ray Mar 31 '11 at 22:52
No problem, we all overlook things sometimes :) – Unsigned Mar 31 '11 at 22:54

Variable i will not be greater than variable j because of the inner loop and thus index r become never less than zero.

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You are missing the conditions in the inner for loop. In that, the value of i goes only upto j. So if it exceeds j, the loop will be terminated. Hence no question of the negative indices you mentioned.

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