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I have ID values of the type unsigned int. I need to map an Id to a pointer in constant time.


Key Distribution:

ID will have a value in the range of 0 to uint_max. Most of keys will be clustered into a single group, but there will be outliers.


Implementation:

  • I thought about using the C++ ext hash_map stuff, but I've heard their performance isn't too great when keys have a huge potential range.

  • I've also thought of using some form of chained lookup (equivalent to recursively subdividing the range into C chucks). If there are no keys in a range, that range will point to NULL.

    N = Key Range

    Level 0 (divided into C = 16, so 16 pieces) = [0, N/16), [N/16, 2*(N/16)), ...

    Level 1 (divided into C = 16, so 16 * 16 pieces) = ...


Does anyone else have ideas on how this mapping can be more efficiently implemented?

Update:

By constant, I just meant each key lookup is not significantly influenced by the # of values in the item. I did not mean it had to be a single op.

  • Also, please try to minimize the memory usage (similar to the chained lookup above...). Please don't suggest allocating an array with size KEY_RANGE ;) – jameszhao00 Aug 27 '09 at 5:24
11

Use a hash map (unordered_map). This gives ~O(1) look-up times. You "heard" it was bad, but did you try it, test it, and determine it to be a problem? If not, use a hash map.

After your code gets close to completion, profile it and determine if the look-up times are the main cause of slowness in your program. Chances are, it won't be.

3

If you want a tree-based solution and your ids are in the range {0..n-1} then you can use a very cool data structure called van Emde Boas tree. This will yield all operations in O(log log n) and use O(n) space.

  • Hey, that is cool – kibibu Aug 27 '09 at 5:58
  • In my experience very painful to implement :) But yeah it's very impressive. – ttvd Aug 27 '09 at 7:11
1

You're not going to get constant time.

I'd probably use a B+Tree

  • 1
    A hash map is constant time, most of the time. – GManNickG Aug 27 '09 at 5:17
  • @Gman: It depends on the hash, and the keys. – kibibu Aug 27 '09 at 5:19
  • And the number of buckets – kibibu Aug 27 '09 at 5:20
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    Yup...? And most of the time it'll be very good. – GManNickG Aug 27 '09 at 5:23
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    It's still amortized O(1) on a statistically random distribution of keys. – Pavel Minaev Aug 27 '09 at 7:53
1

If your integer values are 32 bits wide, then you could use a 64-bit platform, allocate 32 gigabytes of memory (8 bytes per 4 billion pointers), and use a flat array. That will be as close as you're going to get to constant lookup time.

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    Side note: The fact that this is even possible today is pretty mind-boggling for those of us who grew up in an era where 64 kilobytes was a fully-decked-out machine. – Greg Hewgill Aug 27 '09 at 5:21
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    Constant time means irrespective of number values you get the same time, what this comment describes is linear time. – Tom Aug 27 '09 at 5:25
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    Whole new meaning to "perfect hashing" :) – ttvd Aug 27 '09 at 5:29
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    @Tom: "Linear time" is a situation where the lookup time depends directly on the number of items in the container. My suggestion doesn't do a search at all, but a single index: a[id] where id is the identifier to look up and a is the big array. – Greg Hewgill Aug 27 '09 at 5:39
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    @Konrad: I was wondering whether anybody would pick up on that! The OP did say "Most keys will be clustered into a single group"... :) – Greg Hewgill Aug 27 '09 at 7:45
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Reserve 4GB of your RAM for this, and simply cast your uint to the pointer. That's definitely constant time.

1

As GMan suggests an unordered_map is probably a good solution. If you are concerned about a large number of collisions in this hash map, then use a hash function that will remove the clustering of your data. For example, you could swap the bytes around.

A good point to note is that you will probably spend more time debugging and proving a custom data structure than one that's already got good pedigree.

1

How many items are to be in such a map and how often is it changed?

If all values fit into the processor's cache, then a std::vector<std::pair<unsigned int,T*>> with presorted values and binary search might be fastest despite the access being O(N).

  • Around 200k items will be in the lookup. – jameszhao00 Aug 27 '09 at 14:39
  • With a 32bit int and a 32bit pointer, that would be 1.6MB. I have no experience with this, but before I'd go and implement something like a vEB tree, I'd pick some integers that hash very well and try to find out how a sorted std::vector with a binary search compares to std::unordered_map performance-wise. – sbi Aug 27 '09 at 15:53

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