Provably correct implementation of insertion sort in Idris.
This is a provably correct implementation of insertion sort in Idris.
Specifically, it is an implementation of the following function definition:
insertionSort :
Ord e =>
(xs:Vect n e) ->
(xs':Vect n e ** (IsSorted xs', ElemsAreSame xs xs'))
Given a list of elements, this function will return:
IsSorted
proof that the output list is sorted, andElemsAreSame
proof that the input list and output lists contain
the same elements.This program makes heavy use of proof terms, a special facility only available in dependently-typed programming languages like Idris.
make run
$ make run
idris -o InsertionSort InsertionSort.idr
./InsertionSort
Please type a space-separated list of integers:
3 2 1
After sorting, the integers are:
1 2 3
Another way to run the program is to run it directly using the Idris interpreter. The advantage here is that you can see not just the resulting sorted output list but also the resulting proof terms of the algorithm.
$ idris --nobanner InsertionSort.idr
*InsertionSort> insertionSort [2,1]
MkSigma [1, 2]
(IsSortedMany 1 2 [] Oh (IsSortedOne 2),
SamenessIsTransitive (PrependXIsPrependX 2
(SamenessIsTransitive (PrependXIsPrependX 1
NilIsNil)
(PrependXIsPrependX 1
NilIsNil)))
(PrependXYIsPrependYX 2
1
NilIsNil)) : Sigma (Vect 2
Integer)
(\xs' =>
(IsSorted xs',
ElemsAreSame [2,
1]
xs'))
Copyright (c) 2015 by David Foster