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I saw in the below link that 2nO(1) is sub exponential complexity. I do not understand the difference between 2n and 2nO(1). Aren't they the same as O(1) evaluates to 1?

https://cs.stackexchange.com/questions/9813/are-there-subexponential-time-algorithms-for-np-complete-problems

I have algorithms of subset sum problem that have been solved in 2n -1 runtime steps thus having O(2n) complexity. Is that sub polynomial time? If it is then it violates the exponential time hypothesis(ETH) and proves P not equal to NP!

I also know that brute force for such problems runs in O(2n). So what is the difference in this complexity and sub exponential one?

Please help. Thanks!

  • Did I see something about a link? – ChiefTwoPencils Apr 2 '15 at 2:55
  • The link uses little-o, not big-O. – Paul Hankin Apr 2 '15 at 4:53
0

O(1) is definitely not the same as 1.

If f(x) is in O(1), then so is g(x)=c×f(x). For example, f(x)=(x−1)⁄x is clearly in O(1) since its asymptotic to 1, and so is g(x)=(x−1) ⁄ 2 x, whose asymptote is 0.5.

But 2n1 (=2n) is quite different from 2n1⁄2 (=2n). The latter certainly could be described as subexponential.

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