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This question: How to de-interleave bits (UnMortonizing?) has a good answer for extracting one of the two halves of a Morton number (just the odd bits), but I need a solution which extracts both parts (the odd bits and the even bits) in as few operations as possible.

For my use I would need to take a 32 bit int and extract two 16 bit ints, where one is the even bits and the other is the odd bits shifted right by 1 bit, e.g.

input,  z: 11101101 01010111 11011011 01101110

output, x: 11100001 10110111 // odd bits shifted right by 1
        y: 10111111 11011010 // even bits

There seem to be plenty of solutions using shifts and masks with magic numbers for generating Morton numbers (i.e. interleaving bits), e.g. Interleave bits by Binary Magic Numbers, but I haven't yet found anything for doing the reverse (i.e. de-interleaving).


After re-reading the section from Hacker's Delight on perfect shuffles/unshuffles I found some useful examples which I adapted as follows:

// morton1 - extract even bits

uint32_t morton1(uint32_t x)
    x = x & 0x55555555;
    x = (x | (x >> 1)) & 0x33333333;
    x = (x | (x >> 2)) & 0x0F0F0F0F;
    x = (x | (x >> 4)) & 0x00FF00FF;
    x = (x | (x >> 8)) & 0x0000FFFF;
    return x;

// morton2 - extract odd and even bits

void morton2(uint32_t *x, uint32_t *y, uint32_t z)
    *x = morton1(z);
    *y = morton1(z >> 1);

I think this can still be improved on, both in its current scalar form and also by taking advantage of SIMD, so I'm still interested in better solutions (either scalar or SIMD).

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The interleaving solution you link to uses twice as many operations as the de-interleaving solution you link to. If this is acceptable, you can achieve the same performance by applying the de-interleaving solution twice. I don't think you can do any better than that, since both solutions use the same principle and have stages where half of the bits are 0, so they can only process half of the information in one go, so if you want all the information you need two gos. Of course you can do it in one go if you have 64-bit integers; then you can move one of the parities into the upper 32 bits. –  joriki Feb 5 '11 at 20:20
@joriki: thanks - I was hoping that there might be a more efficient way of extracting both parts simultanously. I'm looking at the "perfect shuffle" examples in Hacker's Delight and wondering if these are applicable (results in high and low half of output word). I'm also wondering whether I can use SIMD (SSE3/SSE4) to perhaps get a 2x improvement. –  Paul R Feb 5 '11 at 20:25
I played around with this some more -- I didn't come up with a better solution but I did make a somewhat interesting observation: You could efficiently change AaBbCcDd.. into ABabCDcd.. if you could efficiently change 0aB00cD0.. into 0Ba00Dc0.. -- so you can reduce this step to efficiently swapping two bits, which means implementing the map 0->0, 3->3, 1->2, 2->1. The reversible operations on two bits (mod 4) that I can think of are: adding 0, 1, 2 or 3, XORing with 1 or 3, or multiplying by 3. But these only generate an 8-element subgroup of S_4 that doesn't include the required permuation. –  joriki Feb 6 '11 at 9:41
I assume that by "interleave operation" you mean treating the upper 16 bits of a 32-bit word as odd bits and the lower 16 bits as even bits and obtaining a new 32-bit word by interleaving them? The abstract answer is that yes, it's cyclical, since it's a bijective operation and there is a finite number of different 32-bit words :-) But more practically speaking, the cycle length is 5: The interleaving operation cycles the digits in the binary representation of the bit indices, the least significant digit becoming the most significant, and there are 5 digits to cycle through for a 32-bit word. –  joriki Feb 6 '11 at 11:29
Another thought I had, thinking out of the box a bit: Do you need the odd and even bits in the right order? Or could you restructure the rest of your code (for instance by using different lookup tables) such that you can accept them in a different order? Because getting them in a different order is very easy: odd = x & 0xaaaaaaaa; odd = (odd | (odd >>> 17)) & 0xffff; even = x & 0x55555555; even = (even | (even >>> 15)) & 0xffff; –  joriki Feb 6 '11 at 11:34
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2 Answers 2

up vote 4 down vote accepted

If your processor handles 64 bit ints efficiently, you could combine the operations...

int64 w = (z &0xAAAAAAAA)<<31 | (z &0x55555555 )
w = (w | (w >> 1)) & 0x3333333333333333;
w = (w | (w >> 2)) & 0x0F0F0F0F0F0F0F0F; 
share|improve this answer
Ah yes - that's a good idea - I will only be working 64 bit CPUs so this is definitely worth doing. –  Paul R Feb 7 '11 at 19:33
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If you need speed than you can use table-lookup for one byte conversion at once (two bytes table is faster but to big). Procedure is made under Delphi IDE but the assembler/algorithem is the same.

  MortonTableLookup : array[byte] of byte = ($00, $01, $10, $11, $12, ... ;

procedure DeinterleaveBits(Input: cardinal);
//In: eax
//Out: dx = EvenBits; ax = OddBits;
  movzx   ecx, al                                     //Use 0th byte
  mov     dl, byte ptr[MortonTableLookup + ecx]
  shr     eax, 8
  movzx   ecx, ah                                     //Use 2th byte
  mov     dh, byte ptr[MortonTableLookup + ecx]
  shl     edx, 16
  movzx   ecx, al                                     //Use 1th byte
  mov     dl, byte ptr[MortonTableLookup + ecx]
  shr     eax, 8
  movzx   ecx, ah                                     //Use 3th byte
  mov     dh, byte ptr[MortonTableLookup + ecx]
  mov     ecx, edx  
  and     ecx, $F0F0F0F0
  mov     eax, ecx
  rol     eax, 12
  or      eax, ecx

  rol     edx, 4
  and     edx, $F0F0F0F0
  mov     ecx, edx
  rol     ecx, 12
  or      edx, ecx
share|improve this answer
Thanks - I'm also considering a table lookup approach, but using SSSE3's PSHUFB instruction to perform multiple 4 bit lookups in parallel - the advantage of this, in addition to parallelism, would be that it doesn't require memory accesses for the table lookup. –  Paul R Feb 7 '11 at 9:29
It will be very nice of you to see that solution... :) –  GJ. Feb 9 '11 at 14:26
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