UPD: Fixed the code (insertion in a random order), based on the comment.
I recently implemented Treap, one of various kinds of binary search trees (BSTs), on Rust. It is a balanced BST, which means that it ensures that tree depth is always where n = (the number of items in a tree). That is achieved by using randomisation. (For more details see Treap — Wikipedia.)
Experiments
Here are results of some experiments (UPD: these experiments themselves take O(n2)-time, because function depth() takes O(n)-time, which is called in each iteration.):
. (1) Insertion of 10000 elements in the ascending order:
http://ideone.com/tSrw7u
It took 11.7 seconds to insert 30000 elements in the ascending order, and it got Time Limit Exceeded (>15.0sec) when the number of elements is >100000. You'll see that the depth of the treap increases in logarithmic speed.
(2) Insertion of 10000 elements in a random order:
http://ideone.com/pW7sBf
It took 15.011.8 seconds to insert 30000 elements in a random order. Like (1), the depth of the treap increases in logarithmic speed, too.
Here is a graph that indicates how the depth of the treap grows as the number of elements increases. The horizontal line shows the number of nodes in the treap and the vertial one shows the depth of the treap.
Conclusion
We have a balanced BST, whose depth is bounded by !
Unfortunately, a solution (25637342) to 785E - Anton and Permutation that uses this treap, which should work in -time, got the Time limit exceeded verdict. That seems because of its heavy constant factor, but I'm not sure.
References
The code I used in these experiments is avaliable at: https://github.com/koba-e964/contest/blob/906fcb07057b72496407b3c6e6a422e48e60dc6f/comm/Treap.rs
http://ideone.com/tSrw7u
http://ideone.com/pW7sBf
This implementation of treap largely depends on the slide (https://www.slideshare.net/iwiwi/2-12188757, written in Japanese) by iwiwi. This implementation of treap is verified by http://arc061.contest.atcoder.jp/submissions/1172709 (AtCoder ARC 061 D, problem statement is avaliable at http://arc061.contest.atcoder.jp/tasks/arc061_b ).