The structure that is used for indexes of database programs is a B+ Tree. It is a balanced bucketed n-ary tree.
For a b-order B+ tree with h levels of index:
- The maximum number of records stored is n = b^h
- The minimum number of keys is 2(b/2)^(h−1)
- The space required to store the tree is O(n)
- Inserting a record requires O(log-b(n)) operations in the worst case
- Finding a record requires O(log-b(n)) operations in the worst case
- Removing a (previously located) record requires O(log-b(n)) operations in the worst case
- Performing a range query with k elements occurring within the range requires O(log-b(n+k)) operations in the worst case.
I use this in my program. You can add your data to the structure as it comes and you can always traverse it in order, front to back or back to front, or search quickly for any value. If you don't find the value, you will have the insertion point where you can add the value.
You can optimize the structure for your program by playing around with b, the size of the buckets.
An interesting presentation about B+ trees: Tree-Structured Indexes
You can get the entire code in C++.
Edit: Now I see your comment that your requirement to know the "i-th sorted element in the set" is an important one. All of a sudden, that makes many data structures less than optimal.
You are probably best off with a SortedList or even better, a SortedDictionary. See the article: Squeezing more performance from SortedList. Both structures have a GetKey function that will return the i-th element.