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I need to solve: T(n) = T(n-1) + O(1)

when I find the general T(n) = T(n-k) + k O(1) what sum is it? I mean when I reach the base case: n-k=1; k=n-1 Is it "sum k, k=1 to n"? but the result of this sum is n(n-1)/2 and I know that the result is O(n). So I know that I don't need a sum with this relation but what sum is correct for this recurrence relation?


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up vote 1 down vote accepted

If we make the (reasonable) assumption that T(0) = 0 (or T(1) = O(1)), then we can apply your
T(n) = T(n - k) + k⋅O(1) to k = n and obtain

T(n) = T(n - n) + n⋅O(1) = 0 + n⋅O(1) = O(n).

Edit: if you insist on representing the recurrence as a sum, here it is:

T(n) = T(n - 1) + O(1) = T(n - 2) + O(1) + O(1) = ... = Σk = 1,...n O(1) = n⋅O(1) = O(n)

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ok thanks, but in terms of summation? I know the result and the way to solve it but I'd like to understand what sum is related to this relation, I mean how can I write "k times O(1)" in terms of sum? Something like sum of k, from k=1 to n? thanks – Frank Jan 2 '13 at 22:44
Added representation as a sum. Is this what you were looking for? – Dino Jan 4 '13 at 7:34

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