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I'm trying to sort d-dimensional data vectors by their Hilbert order, for bulk-loading a spatial index.

However, I do not want to compute the Hilbert value for each point explicitly, which in particular requires setting a particular precision. In high-dimensional data, this involves a precision such as 32*d bits, which becomes quite messy to do efficiently. When the data is distributed unevenly, some of these calculations are unnecessary, and extra precision for parts of the data set are necessary.

Instead, I'm trying to do a partitioning approach. When you look at the 2D first order hilbert curve

1   4
|   |
2---3

I'd split the data along the x-axis first, so that the first part (not necessarily containing half of the objects!) will consist of 1 and 2 (not yet sorted) and the second part will have objects from 3 and 4 only. Next, I'd split each half again, on the Y axis, but reverse the order in 3-4.

So essentially, I want to perform a divide-and-conquer strategy (closely related to QuickSort - on evenly distributed data this should even be optimal!), and only compute the necessary "bits" of the hilbert index as needed. So assuming there is a single object in "1", then there is no need to compute the full representation of it; and if the objects are evenly distributed, partition sizes will drop quickly.

I do know the usual textbook approach of converting to long, gray-coding, dimension interleaving. This is not what I'm looking for (there are plenty of examples of this available). I explicitly want a lazy divide-and-conquer sorting only. Plus, I need more than 2D.

Does anyone know of an article or hilbert-sorting algorithm that works this way? Or a key idea how to get the "rotations" right, which representation to choose for this? In particular in higher dimensionalities... in 2D it is trivial; 1 is rotated +y, +x, while 4 is -y,-x (rotated and flipped). But in higher dimensionalities this gets more tricky, I guess.

(The result should of course be the same as when sorting the objects by their hilbert order with a sufficiently large precision right away; I'm just trying to save the time computing the full representation when not needed, and having to manage it. Many people keep a hashmap "object to hilbert number" that is rather expensive.)

Similar approaches should be possible for Peano curves and Z-curve, and probably a bit easier to implement... I should probably try these first (Z-curve is already working - it indeed boils down to something closely resembling a QuickSort, using the appropriate mean/grid value as virtual pivot and cycling through dimensions for each iteration).

Edit: see below for how I solved it for Z and peano curves. It is also working for 2D Hilbert curves already. But I do not have the rotations and inversion right yet for Hilbert curves.

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can you use an OctTree instead? –  Mikeb Dec 12 '11 at 21:04
    
No, octrees don't scale up well to imbalanced and high-dimensional data. They are good for 3D games that cover space rather evenly. –  Anony-Mousse Dec 12 '11 at 21:07
    
This sounds like a dynamic Hilbert R-tree, en.wikipedia.org/wiki/Hilbert_R-tree –  John L Dec 13 '11 at 1:21
    
Yes, I intend to use this for bulk-loading an R-tree by presorting the objects along to their Hilbert order ("Hilbert packing"). I do not intend to store the entry and/or exit points though, so it won't be a full "dynamic Hilbert R-tree". –  Anony-Mousse Dec 13 '11 at 7:55
    
This link may be relevant. –  Evgeny Kluev Dec 13 '11 at 20:40
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4 Answers

Use radix sort. Split each 1-dimensional index to d .. 32 parts, each of size 1 .. 32/d bits. Then (from high-order bits to low-order bits) for each index piece compute its Hilbert value and shuffle objects to proper bins.

This should work well with both evenly and unevenly distributed data, both Hilbert ordering or Z-order. And no multi-precision calculations needed.

One detail about converting index pieces to Hilbert order:

  • first extract necessary bits,
  • then interleave bits from all dimensions,
  • then convert 1-dimensional indexes to inverse Gray code.

If the indexes are stored in doubles:

  • If indexes may be negative, add some value to make everything positive and thus simplify the task.
  • Determine the smallest integer power of 2, which is greater than all the indexes and divide all indexes to this value
  • Multiply the index to 2^(necessary number of bits for current sorting step). Truncate the result, convert it to integer, and use it for Hilbert ordering (interleave and compute the inverse Gray code)
  • Subtract the result, truncated on previous step, from the index: index = index - i

Coming to your variant of radix sort, i'd suggest to extend zsort (to make hilbertsort out of zsort) with two binary arrays of size d (one used mostly as a stack, other is used to invert index bits) and the rotation value (used to rearrange dimensions).

If top value in the stack is 1, change pivotize(... ascending) to pivotize(... descending), and then for the first part of the recursion, push this top value to the stack, for second one - push the inverse of this value. This stack should be restored after each recursion. It contains the "decision tree" of last d recursions of radix sort procedure (in inverse Gray code).

After d recursions this "decision tree" stack should be used to recalculate both the rotation value and the array of inversions. The exact way how to do it is non-trivial. It may be found in the following links: hilbert.c or hilbert.c.

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Re: Edit3. Doesn't seem to work out right yet. According to my sketches, I will actually need to vary the splitting sequence. In 2D, my first two splits are x and y. The third split however will be x for cubes 2 and 3 in my sketch above, whereas for cubes 1 and 4 I will have to split in y (for the divide and conquer to work). This corresponds to rotated iterations of the pattern. In 3D+ it will become even more complex. :-( But +1 nevertheless for your helpful reply. –  Anony-Mousse Dec 13 '11 at 16:33
    
How does the ringbuffer determine the next split axis? –  Anony-Mousse Dec 13 '11 at 16:54
    
The first axis split after one level varies from pattern to pattern. In the initial setting (which is after splitting x,y), 1 and 4 must be split y,x, while 2 and 3 must be split x,y. This corresponds to the Hilbert basic pattern being used rotated. –  Anony-Mousse Dec 13 '11 at 17:04
    
Yes. There is a flaw in this algorithm somewhere. I need to think. –  Evgeny Kluev Dec 13 '11 at 17:20
    
Alas, all my attempts to find working algorithm for d>2 failed. I think I should just remove this answer. –  Evgeny Kluev Dec 13 '11 at 20:45
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You can compute the hilbert curve from f(x)=y directly without using recursion or L-systems or divide and conquer. Basically it's a gray code or hamiltonian path traversal. You can find a good description at Nick's spatial index hilbert curve quadtree blog or from the book hacker's delight. Or take a look at monotonic n-ary gray code. I've written an implementation in php including a moore curve.

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Well, I don't want to compute the Hilbert curve. I want to sort objects according to their position along it, without computing the full hilbert curve, but only lazly computing those separators that I need. –  Anony-Mousse Dec 13 '11 at 7:54
    
@Anonymouse: I don't think you can compute half a curve but you can use a table i.e. precalculated curve. –  Phpdna Dec 13 '11 at 12:06
    
Well, I'm not at all looking at curves. I'm just looking at single bits for ordering. The "visual" stuff is not what I'm interested in. –  Anony-Mousse Dec 13 '11 at 22:06
    
@Anonymouse: Unfortunaetly it's called hilbert curve and what you suggesting is something different. I know what you mean by sorting. I use it myself. I've written a php version with a moore curve. Also the hilbert curve doesn't hurt the eye. –  Phpdna Dec 14 '11 at 1:11
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Progress report

I have Z-Curve and Peano Curve working.

Key requirement is a pivotize function that (in O(n)) splits a list into two parts, such that A < pivot <= B or A > pivot >= B depending on a direction flag.

Z curve is the most simple, it then boils down to (pseudocode, add obvious stop conditions for lists with less than two elements)

zsort(list, start, end, curdim, ranges)
   mean = (ranges[curdim].max + ranges[curdim].min) / 2
   pivot = pivotize(list, start, end, mean, ascending)

   ranges[curdim].max = mean
   zsort(list, start, pivot, nextdim, ranges)
   restore ranges[curdim].max

   ranges[curdim].min = mean
   zsort(list, pivot, end, nextdim, ranges)
   restore ranges[curdim].min

zsort(list, 0, length, 0, computeRanges(list))

Similarly, peano sorting, but with a "inversions" bitset:

peanosort(list, start, end, curdim, ranges, inversions)
   compute firstthird, secondthird for curdim
   pivot1 = pivotize(list, start, end, firstthird, inversions[curdim])
   pivot2 = pivotize(list, pivot1, end, secondthird, inversions[curdim])
   // we now have three lists A < B < C or A > B > C, depending on the inversion

   update ranges[curdim] for first third
   peanosort(list, start, pivot1, nextdim, ranges, inversions)
   restore ranges[curdim]

   update ranges[curdim] for second third
   inversions = !inversions ^ curdim
   peanosort(list, pivot1, pivot2, nextdim, ranges, inversions)
   inversions = !inversions ^ curdim // restore inversions

   update ranges[curdim] for third third
   peanosort(list, pivot2, end, nextdim, ranges, inversions)

   restore ranges[curdim] // undo any changes for returning

peanosort(list, 0, length, 0, new Bitset(dimensions), computeRanges(list))

I havn't updated my code yet, but I belive I can remove the bitset by essentially encoding this information by using "max < min" for inverted columns. Obviously, it will only give marginal improvements at most.

Assuming a non-skewed distribution of the data, each range should be approximately the same size. The runtime of both algorithms should therefore be O(n log n) on average.

For Hilbert sorting, I belive I will need a rotation parameter. I'm still trying to figure this one out right ... the difficulty is that I don't go down one "level" each iteration, but one dimension, so I have some interim curves to figure out; for arbitrary dimensionality.

Update: I have a working code for 2D now, and a clear vision of how to sort it out for 3D (essentially by using an inversion bitset as with peano). I will post updates here.

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I already answered this question (and others) but my answer(s) mysteriously disappeared. The Compact Hilbert Index implemention from http://code.google.com/p/uzaygezen/source/browse/trunk/core/src/main/java/com/google/uzaygezen/core/CompactHilbertCurve.java (method index()) already allows one to limit the number of hilbert index bits computed up to a given level. Each iteration of the loop from the mentioned method computes a number of bits equal to the dimensionality of the space. You can easily refactor the for loop to compute just one level (i.e., a number of bits equal to the dimensionality of the space) at a time, going only as deeply as needed to compare lexicographically two numbers by their Compact Hilbert Index.

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But the code is still level-wise, not bitwise. For a high dimensional setting, say 128 dimensions, that seems like a bit more work than necessary, as much less than the 128 dimensions can in fact suffice already to discern all of my data (at least unless very heavily clustered). –  Anony-Mousse Mar 29 '12 at 14:14
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