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3b0496b8ab
I didn't add any export labels because none of this is actually useful for anything, but the proofs are cool.
57 lines
1.5 KiB
Idris
57 lines
1.5 KiB
Idris
||| Properties of factorial functions
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module Data.Nat.Fact
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import Data.Nat
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%default total
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||| Recursive definition of factorial.
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factRec : Nat -> Nat
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factRec Z = 1
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factRec (S k) = (S k) * factRec k
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||| Tail-recursive accumulator for factItr.
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factAcc : Nat -> Nat -> Nat
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factAcc Z acc = acc
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factAcc (S k) acc = factAcc k $ (S k) * acc
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||| Iterative definition of factorial.
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factItr : Nat -> Nat
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factItr n = factAcc n 1
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----------------------------------------
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||| Multiplicand-shuffling lemma.
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multShuffle : (a, b, c : Nat) -> a * (b * c) = b * (a * c)
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multShuffle a b c =
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rewrite multAssociative a b c in
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rewrite multCommutative a b in
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sym $ multAssociative b a c
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||| Multiplication of the accumulator.
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factAccMult : (a, b, c : Nat) ->
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a * factAcc b c = factAcc b (a * c)
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factAccMult _ Z _ = Refl
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factAccMult a (S k) c =
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rewrite factAccMult a k (S k * c) in
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rewrite multShuffle a (S k) c in
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Refl
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||| Addition of accumulators.
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factAccPlus : (a, b, c : Nat) ->
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factAcc a b + factAcc a c = factAcc a (b + c)
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factAccPlus Z _ _ = Refl
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factAccPlus (S k) b c =
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rewrite factAccPlus k (S k * b) (S k * c) in
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rewrite sym $ multDistributesOverPlusRight (S k) b c in
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Refl
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||| The recursive and iterative definitions are the equivalent.
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factRecItr : (n : Nat) -> factRec n = factItr n
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factRecItr Z = Refl
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factRecItr (S k) =
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rewrite factRecItr k in
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rewrite factAccMult k k 1 in
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rewrite multOneRightNeutral k in
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factAccPlus k 1 k
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