# Linear time algorithm to compute cartesian product

I was asked in an interview to come up with a solution with linear time for cartesian product. I did the iterative manner O(mn) and a recursive solution also which is also O(mn). But I could not reduce the complexity further. Does anyone have ideas on how this complexity can be improved? Also can anyone suggest an efficient recursive approach?

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There are `mn` results; the minimum work you have to do is write each result to the output. So you cannot do better than `O(mn)`. –  Oli Charlesworth Feb 26 at 0:17
No. Cartesian product gives all possible pairs that can be formed by 2 sets, so it is not possible to further reduce it. –  nhahtdh Feb 26 at 0:18
Maybe your interviewer was thinking of using a quantum computer –  gnibbler Feb 26 at 0:21
Sack the interviewer! –  Mitch Wheat Feb 26 at 0:26
@gnibbler: I don't know if you meant that as a joke but I am pretty sure a quantum computer couldn't do any better –  Andrew White Feb 26 at 1:26
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There are `mn` results; the minimum work you have to do is write each result to the output. So you cannot do better than `O(mn)`.