I want grouped ranking on a very large table, I've found a couple of solutions for this problem e.g. in this post and other places on the web. I am, however, unable to figure out the worst case complexity of these solutions. The specific problem consists of a table where each row has a number of points and a name associated. I want to be able to request rank intervals such as 1-4. Here are some data examples:

```
name | points
Ab 14
Ac 14
B 16
C 16
Da 15
De 13
```

With these values the following "ranking" is created:

```
Query id | Rank | Name
1 1 B
2 1 C
3 3 Da
4 4 Ab
5 4 Ac
6 6 De
```

And it should be possible to create the following interval on query-id's: 2-5 giving rank: 1,3,4 and 4.

The database holds about 3 million records so if possible I want to avoid a solution with complexity greater than log(n). There are constantly updates and inserts on the database so these actions should preferably be performed in log(n) complexity as well. I am not sure it's possible though and I've tried wrapping my head around it for some time. I've come to the conclusion that a binary search should be possible but I haven't been able to create a query that does this. I am using a MySQL server.

I will elaborate on how the pseudo code for the filtering could work. Firstly, an index on (points, name) is needed. As input you give a fromrank and a tillrank. The total number of records in the database is n. The pseudocode should look something like this:

Find median point value, count rows less than this value (the count gives a rough estimate of rank, not considering those with same amount of points). If the number returned is greater than the fromrank delimiter, we subdivide the first half and find median of it. We keep doing this until we are pinpointed to the amount of points where fromrank should start. then we do the same within that amount of points with the name index, and find median until we have reached the correct row. We do the exact same thing for tillrank.

The result should be log(n) number of subdivisions. So given the median and count can be made in log(n) time it should be possible to solve the problem in worst case complexity log(n). Correct me if I am wrong.