Copyright | (c) Levent Erkok |
---|---|

License | BSD3 |

Maintainer | erkokl@gmail.com |

Stability | experimental |

Safe Haskell | None |

Language | Haskell2010 |

The PrefixSum algorithm over power-lists and proof of the Ladner-Fischer implementation. See http://dl.acm.org/citation.cfm?id=197356 and http://www.cs.utexas.edu/~plaxton/c/337/05f/slides/ParallelRecursion-4.pdf.

- type PowerList a = [a]
- tiePL :: PowerList a -> PowerList a -> PowerList a
- zipPL :: PowerList a -> PowerList a -> PowerList a
- unzipPL :: PowerList a -> (PowerList a, PowerList a)
- ps :: (a, a -> a -> a) -> PowerList a -> PowerList a
- lf :: (a, a -> a -> a) -> PowerList a -> PowerList a
- flIsCorrect :: Int -> (forall a. (OrdSymbolic a, Num a, Bits a) => (a, a -> a -> a)) -> Symbolic SBool
- thm1 :: IO ThmResult
- thm2 :: IO ThmResult

# Formalizing power-lists

type PowerList a = [a] Source #

A poor man's representation of powerlists and basic operations on them: http://dl.acm.org/citation.cfm?id=197356 We merely represent power-lists by ordinary lists.

zipPL :: PowerList a -> PowerList a -> PowerList a Source #

The zip operator, zips the power-lists of the same size, returns a powerlist of double the size.

# Reference prefix-sum implementation

ps :: (a, a -> a -> a) -> PowerList a -> PowerList a Source #

Reference prefix sum (`ps`

) is simply Haskell's `scanl1`

function.

# The Ladner-Fischer parallel version

lf :: (a, a -> a -> a) -> PowerList a -> PowerList a Source #

The Ladner-Fischer (`lf`

) implementation of prefix-sum. See http://www.cs.utexas.edu/~plaxton/c/337/05f/slides/ParallelRecursion-4.pdf
or pg. 16 of http://dl.acm.org/citation.cfm?id=197356

# Sample proofs for concrete operators

flIsCorrect :: Int -> (forall a. (OrdSymbolic a, Num a, Bits a) => (a, a -> a -> a)) -> Symbolic SBool Source #

Correctness theorem, for a powerlist of given size, an associative operator, and its left-unit element.

Proves Ladner-Fischer is equivalent to reference specification for addition.
`0`

is the left-unit element, and we use a power-list of size `8`

. We have:

`>>>`

Q.E.D.`thm1`