In practice, for small datasets using contiguous storage is not a problem, and for large datasets O(log(n)) is just as good as O(1); the constant factor is rather more important.

In fact, For REALLY large datasets, O(root3(n)) random access is the best you can get in a 3-dimensional physical universe.

**Edit:**
Assuming log10 and the O(log(n)) algorithm being twice as fast as the O(1) one at a million elements, it will take a trillion elements for them to become even, and a quintillion for the O(1) algorithm to become twice as fast - rather more than even the biggest databases on earth have.

All current and foreseeable storage technologies require a certain physical space (let's call it v) to store each element of data. In a 3-dimensional universe, this means for n elements there is a minimum distance of root3(n*v*3/4/pi) between at least some of the elements and the place that does the lookup, because that's the radius of a sphere of volume n*v. And then, the speed of light gives a physical lower boundary of root3(n*v*3/4/pi)/c for the access time to those elements - and that's O(root3(n)), no matter what fancy algorithm you use.