I have a large set of points (n > 10000 in number) in some metric space (e.g. equipped with Jaccard Distance). I want to connect them with a minimal spanning tree, using the metric as the weight on the edges.

- Is there an algorithm that runs in less than O(n
^{2}) time? - If not, is there an algorithm that runs in less than O(n
^{2}) average time (possibly using randomization)? - If not, is there an algorithm that runs in less than O(n
^{2}) time and gives a good approximation of the minimum spanning tree? - If not, is there a reason why such algorithm can't exist?

Thank you in advance!

**Edit for the posters below:**
Classical algorithms for finding minimal spanning tree don't work here. They have an E factor in their running time, but in my case E = n^{2} since I actually consider the complete graph. I also don't have enough memory to store all the >49995000 possible edges.