I just read in Cormen's algorithm book that big-O and big-omega do not follow the trichotomy property. That means for two functions,
g(n), it may be the case that neither
f(n) = O(g(n)) nor
f(n) = Omega(g(n)) holds. In example they argue that if function is
n^(1+sin n) than it is possible.
While it is correct is it possible in a real world algorithm to have a run time of something like
sin n. Since it would sometimes decrease, with the increase of input size. Does anybody knows any such algorithm or can give a small code snippet which does this.
Thanks for the answers, so in that case is it correct to assume that Given a problem P with size n, if it can not be solved in O(f(n)) time by any known algorithm, then the lower bound of P is Omega(f(n)).