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This is the pseudocode for the radix sort:

Pseudocode for Radix Sort:
Radix-Sort(A, d)
// Each key in A[1..n] is a d-digit integer. (Digits are
// numbered 1 to d from right to left.)
1. for i = 1 to d do
Use a stable sorting algorithm to sort A on digit i.

This is the Scala code for the radix sort:

object RadixSort {
  val WARP_SIZE = 32

  def main(args: Array[String]) = {
    var A = Array(123,432,654,3123,654,2123,543,131,653,123)

    radixSortUintHost(A, 4).foreach(i => println(i))
  }

  // LSB radix sort
  def radixSortUintHost(A: Array[Int], bits: Int): Array[Int] = {
    var a = A
    var b = new Array[Int](a.length)

    var rshift = 0
    var mask = ~(-1 << bits)

    while (mask != 0) {
      val cntArray = new Array[Int](1 << bits)

      for (p <- 0 until a.length) {
        var key = (a(p) & mask) >> rshift
        cntArray(key)+= 1
      }

      for (i <- 1 until cntArray.length)
        cntArray(i) += cntArray(i-1)

      for (p <- a.length-1 to 0 by -1) {
        var key = (a(p) & mask) >> rshift
        cntArray(key)-= 1
        b(cntArray(key)) = a(p)
      }

      val temp = b
      b = a
      a = temp

      mask <<= bits
      rshift += bits
    }

    b
  }
}

This is the Haskell code for the radix sort:

import Data.Bits (Bits(testBit, bitSize))
import Data.List (partition)

lsdSort :: (Ord a, Bits a) => [a] -> [a]
lsdSort = fixSort positiveLsdSort

msdSort :: (Ord a, Bits a) => [a] -> [a]
msdSort = fixSort positiveMsdSort

-- Fix a sort that puts negative numbers at the end, like positiveLsdSort and positiveMsdSort
fixSort sorter list = uncurry (flip (++)) (break (< 0) (sorter list))

positiveLsdSort :: (Bits a) => [a] -> [a]
positiveLsdSort list = foldl step list [0..bitSize (head list)] where
step list bit = uncurry (++) (partition (not . flip testBit bit) list)

positiveMsdSort :: (Bits a) => [a] -> [a]
positiveMsdSort list = aux (bitSize (head list) - 1) list where
aux _ [] = []
aux (-1) list = list
aux bit list = aux (bit - 1) lower ++ aux (bit - 1) upper where
    (lower, upper) = partition (not . flip testBit bit) list

My question is: Can you formulate a monoid or semigroup for the radix sort?

share|improve this question
1  
You mean a new semigroup instance whose binary operation uses radix sort to preserve ordering? –  David Young Feb 21 '14 at 17:00
1  
Yes. –  Daniel Wagner Feb 21 '14 at 21:20
7  
You can't "write an algorithm (sort or otherwise) as a monoid". You may be able to formulate the algorithm using monoids, as in the answer to your other question stackoverflow.com/questions/21877572/… –  Alexey Romanov Feb 22 '14 at 6:30
    
Thanks @AlexeyRomanov - that's helpful - I've updated the question. –  hawkeye Feb 26 '14 at 11:14

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