All things being equal, I'd expect most people to use whatever is most conveniently available, and that tends to be qsort(3). Other than that quicksort is known to be very fast on arrays, just like mergesort is the common choice for lists.

What I'm wondering is why it's so rare to see [**radix**](http://en.wikipedia.org/wiki/Radix_sort) or bucket sort. They're O(n), at least on linked lists and all it takes is some method of converting the key to an ordinal number. (strings and floats work just fine.) 

I'm thinking the reason has to do with how computer science is taught. I even had to demonstrate to my lecturer in Algorithm analysis that it was indeed possible to sort faster than O(n log(n)). (He had the proof that you can't *comparison* sort faster than O(n log(n)), which is true.)

In other news, floats can be sorted as integers, but you have to turn the negative numbers around afterwards.