Are there problems in P that have a proven asymptotic lower bound of O(n^2) or higher? (n is the number of bits a problem instance can be represented by). This is not a homework question, just curiosity.
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Yes, the time hierarchy theorem implies the existence of such problems. They're arguably not natural because they involve diagonalizing over all O(n^2)time algorithms. 


3SUM comes to mind. There's a quadratic lower bound known for a certain linear decisiontree model due to Jeff Erickson. (There are some barelysubquadratic algorithms for 3SUM in the literature for various models of computation. But I haven't looked at them and I don't know how they work.) 


O(n ^ 2)
. – user529758 Jun 22 '13 at 19:12