Maybe there is another way to consider the analysis?

Agreed, the worst case in O(N^2). But the best case is O(1).

Looking purely at the fact that there is only `equal`

, and the range of values is unknown, then is it fair to say there is only one way to get N^2, and that is when all the values are distinct, or unequal?

Similarly, there would be only one way to guarantee to find a duplicate in 1 test, and that is when all of the values are equal.

There are many ways that it is impossible to have to compare all objects before finding an identical pair. If there are N/2 pairs, N/3 triples, N/4 quadruples, N/sqrt(N) sets of sqrt(N) duplicates, etc., how many must be compared before finding a pair, i.e. a duplicate?

I think this is like the 'find one pair of socks by selecting from a sock draw with an unknown number of identical sets of socks, with two or more identical socks in a set'. The owner of the sock draw restocks the draw by buying unknown numbers of pairs of identical socks, and throws a sock away when it has a hole in it. We don't know how fast the socks wear out, or how fast the owner buys socks.

On *average* wouldn't we expect *much* better performance than N^2?

notasking forallsets of duplicates, justanyduplicates (i.e. two or more objects that test equal)? – gbulmer Apr 12 '12 at 16:46anyduplicates. – angusiguess Apr 12 '12 at 17:31