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I have a set of disjoint integer intervals and want to check whether a given integer lies in one of these intervals. Of course, this can be achieved by means of a binary search in logarithmic time. However, the vast majority of the queries return false, i.e., only very few integers lie in any interval. To speedup the application, I'm looking for a probabilistic, constant-time algorithm (some sort of hash function) that tells me whether a given integer is definitely not or maybe in an interval. Here is a sketch of the intended algorithm, where magic_data_structure is initialized with the intervals stored in tree:

x = some_integer;
if(!magic_data_structure.find(x))
  return false; // definitely not in any interval
return tree.find(x); // binary search on tree

Any ideas or hints for literature? Thank you very much in advance for your help!

P.S.: Does anybody know improvements of interval trees for non-overlapping intervals which (unlike the ones described above) may include other intervals?

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1 Answer 1

This is a naive solution, but constant.

If you are not dealing with extremely large quantities of numbers, you could just use a hash table where the keys are the numbers and the values are a pointer to the set they're in. But of course if there is a lot of data it might take too long (and too much memory) to index it this way.

Looks like there are various disjoint-set data structures and algorithms to store/search them, but I doubt if any of them have constant times.

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