|
LSST Applications g0b6bd0c080+a72a5dd7e6,g1182afd7b4+2a019aa3bb,g17e5ecfddb+2b8207f7de,g1d67935e3f+06cf436103,g38293774b4+ac198e9f13,g396055baef+6a2097e274,g3b44f30a73+6611e0205b,g480783c3b1+98f8679e14,g48ccf36440+89c08d0516,g4b93dc025c+98f8679e14,g5c4744a4d9+a302e8c7f0,g613e996a0d+e1c447f2e0,g6c8d09e9e7+25247a063c,g7271f0639c+98f8679e14,g7a9cd813b8+124095ede6,g9d27549199+a302e8c7f0,ga1cf026fa3+ac198e9f13,ga32aa97882+7403ac30ac,ga786bb30fb+7a139211af,gaa63f70f4e+9994eb9896,gabf319e997+ade567573c,gba47b54d5d+94dc90c3ea,gbec6a3398f+06cf436103,gc6308e37c7+07dd123edb,gc655b1545f+ade567573c,gcc9029db3c+ab229f5caf,gd01420fc67+06cf436103,gd877ba84e5+06cf436103,gdb4cecd868+6f279b5b48,ge2d134c3d5+cc4dbb2e3f,ge448b5faa6+86d1ceac1d,gecc7e12556+98f8679e14,gf3ee170dca+25247a063c,gf4ac96e456+ade567573c,gf9f5ea5b4d+ac198e9f13,gff490e6085+8c2580be5c,w.2022.27
LSST Data Management Base Package
|
This file contains functions for space-filling curves. More...
#include <cstdint>#include <tuple>Go to the source code of this file.
Namespaces | |
| namespace | lsst |
| A base class for image defects. | |
| namespace | lsst::sphgeom |
Functions | |
| uint64_t | lsst::sphgeom::mortonIndex (uint32_t x, uint32_t y) |
mortonIndex interleaves the bits of x and y. More... | |
| std::tuple< uint32_t, uint32_t > | lsst::sphgeom::mortonIndexInverse (uint64_t z) |
mortonIndexInverse separates the even and odd bits of z. More... | |
| uint64_t | lsst::sphgeom::mortonToHilbert (uint64_t z, int m) |
mortonToHilbert converts the 2m-bit Morton index z to the corresponding Hilbert index. More... | |
| uint64_t | lsst::sphgeom::hilbertToMorton (uint64_t h, int m) |
hilbertToMorton converts the 2m-bit Hilbert index h to the corresponding Morton index. More... | |
| uint64_t | lsst::sphgeom::hilbertIndex (uint32_t x, uint32_t y, int m) |
hilbertIndex returns the index of (x, y) in a 2-D Hilbert curve. More... | |
| std::tuple< uint32_t, uint32_t > | lsst::sphgeom::hilbertIndexInverse (uint64_t h, int m) |
hilbertIndexInverse returns the point (x, y) with Hilbert index h, where x and y are m bit integers. More... | |
| uint8_t | lsst::sphgeom::log2 (uint64_t x) |
| uint8_t | lsst::sphgeom::log2 (uint32_t x) |
This file contains functions for space-filling curves.
Mappings between 2-D points with non-negative integer coordinates and their corresponding Morton or Hilbert indexes are provided.
The Morton order implementation, mortonIndex, is straightforward. The Hilbert order implementation is derived from Algorithm 2 in:
C. Hamilton. Compact Hilbert indices. Technical Report CS-2006-07, Dalhousie University, Faculty of Computer Science, Jul 2006. https://www.cs.dal.ca/research/techreports/cs-2006-07
Using the variable names from that paper, n is fixed at 2. As a first step, the arithmetic in the loop over the bits of the input coordinates is replaced by a table lookup. In particular, the lookup maps the values of (e, d, l) at the beginning of a loop iteration to the values (e, d, w) at the end. Since e and d can both be represented by a single bit, and l and w are 2 bits wide, the lookup table has 16 4 bit entries and fits in a single 64 bit integer constant (0x8d3ec79a6b5021f4). The implementation then looks like:
inline uint64_t hilbertIndex(uint32_t x, uint32_t y, uint32_t m) {
uint64_t const z = mortonIndex(x, y);
uint64_t h = 0;
uint64_t i = 0;
for (m = 2 * m; m != 0;) {
m -= 2;
i = (i & 0xc) | ((z >> m) & 3);
i = UINT64_C(0x8d3ec79a6b5021f4) >> (i * 4);
h = (h << 2) | (i & 3);
}
return h;
}
Note that interleaving x and y with mortonIndex beforehand allows the loop to extract 2 bits at a time from z, rather than extracting bits from x and y and then pasting them together. This lowers the total operation count.
Performance is further increased by executing j loop iterations at a time. This requires using a larger lookup table that maps the values of e and d at the beginning of a loop iteration, along with 2j input bits, to the values of e and d after j iterations, along with 2j output bits. In this implementation, j = 3, which corresponds to a 256 byte LUT. On recent Intel CPUs the LUT fits in 4 cache lines, and, because of adjacent cache line prefetch, should become cache resident after just 2 misses.
For a helpful presentation of the technical report, as well as a reference implementation of its algorithms in Python, see Pierre de Buyl's notebook. The Hilbert curve lookup tables below were generated by a modification of that code (available in makeHilbertLuts.py).
Definition in file curve.h.
1.9.2