Timestamps are numbers. why not common numerical comparaison operators like > and < ?

If you have many of timestamps the problem is not different if you just want to filter your set **once**. It's O(n) and every other method will be longer.

On the other hand, with a huge set from which you want to extract **many** different ranges, it could be more efficient to first sort the items. Call the number of search m, the complexity of direct filtering will be O(m.n). With sort followed by search it could be O(n.log(n) + m.log(n)) which is usually much better.

Any O(n.log(n)) sort method will do, including using the built-in sort operator (or b-tree like you suggested). The major difference between efficient sorting methods is if your memory can hold your full set or not. I there is a memory bootleneck to keep both datas and keys (timestamps) in memory you can keep only the timestamp and some index to data in memory and the real data elsewhere (disk file, database). But if your data set is really so big the most efficient solution would probably be to put the whole thing in a database with and index on timestamp (tie to database is real easy using perl).

Then you will have your range. You just use a dicotomic search to look for index of the first element included in range and of the last, complexity will be O(log(n)) (if you do a linear search the whole purpose of sorting will be defeated).

Below example of using sort and binary_search on an array of timestamps, extending use to some data structure with timestamp and content is left as an exercice.

```
use Search::Binary;
my @array = sort ((1, 2, 1, 1, 2, 3, 2, 2, 8, 3, 8, 3) x 100000);
my $nbelt = @array;
sub cmpfn
{
my ($h, $v, $i) = @_;
$i = $lasti + 1 unless $i;
$record = @array[$i||$lasti + 1];
$lasti = $i;
return ($v<=>$record, $i);
}
for (1..1){
$pos = binary_search(1, $nbelt, 2, \&cmpfn);
}
print "found at $pos\n";
```