Nothing Special   »   [go: up one dir, main page]

Well equidistributed long-period linear

The Well Equidistributed Long-period Linear (WELL) is a family of pseudorandom number generators developed in 2006 by François Panneton, Pierre L'Ecuyer, and Makoto Matsumoto (松本 眞).[1] It is a form of linear-feedback shift register optimized for software implementation on a 32-bit machine.

Operational design

edit

The structure is similar to the Mersenne Twister, a large state made up of previous output words (32 bits each), from which a new output word is generated using linear recurrences modulo 2 over a finite binary field  . However, a more complex recurrence produces a denser generator polynomial, producing better statistical properties.

Each step of the generator reads five words of state: the oldest 32 bits (which may straddle a word boundary if the state size is not a multiple of 32), the newest 32 bits, and three other words in between.

Then a series of eight single-word transformations (mostly of the form   and six exclusive-or operations combine those into two words, which become the newest two words of state, one of which will be the output.

Variants

edit

Specific parameters are provided for the following generators:

  • WELL512a
  • WELL521a, WELL521b
  • WELL607a, WELL607b
  • WELL800a, WELL800b
  • WELL1024a, WELL1024b
  • WELL19937a, WELL19937b, WELL19937c
  • WELL21701a
  • WELL23209a, WELL23209b
  • WELL44497a, WELL44497b.

Numbers give the state size in bits; letter suffixes denote variants of the same size.

Implementations

edit

References

edit
  1. ^ Panneton, François O.; l'Ecuyer, Pierre; Matsumoto, Makoto (March 2006). "Improved long-period generators based on linear recurrences modulo 2" (PDF). ACM Transactions on Mathematical Software. 32 (1): 1–16. CiteSeerX 10.1.1.73.5499. doi:10.1145/1132973.1132974. S2CID 7368302.
edit