/- Copyright (c) 2016 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Author: Leonardo de Moura -/ prelude import init.logic init.data.nat.basic open decidable list notation h :: t := cons h t notation `[` l:(foldr `, ` (h t, cons h t) nil `]`) := l universes u v w instance (α : Type u) : inhabited (list α) := ⟨list.nil⟩ variables {α : Type u} {β : Type v} {γ : Type w} namespace list protected def append : list α → list α → list α | [] l := l | (h :: s) t := h :: (append s t) instance : has_append (list α) := ⟨list.append⟩ protected def mem : α → list α → Prop | a [] := false | a (b :: l) := a = b ∨ mem a l instance : has_mem α (list α) := ⟨list.mem⟩ instance decidable_mem [decidable_eq α] (a : α) : ∀ (l : list α), decidable (a ∈ l) | [] := is_false not_false | (b::l) := if h₁ : a = b then is_true (or.inl h₁) else match decidable_mem l with | is_true h₂ := is_true (or.inr h₂) | is_false h₂ := is_false (not_or h₁ h₂) end def concat : list α → α → list α | [] a := [a] | (b::l) a := b :: concat l a instance : has_emptyc (list α) := ⟨list.nil⟩ protected def insert [decidable_eq α] (a : α) (l : list α) : list α := if a ∈ l then l else concat l a instance [decidable_eq α] : has_insert α (list α) := ⟨list.insert⟩ protected def union [decidable_eq α] : list α → list α → list α | l₁ [] := l₁ | l₁ (a::l₂) := union (insert a l₁) l₂ instance [decidable_eq α] : has_union (list α) := ⟨list.union⟩ protected def inter [decidable_eq α] : list α → list α → list α | [] l₂ := [] | (a::l₁) l₂ := if a ∈ l₂ then a :: inter l₁ l₂ else inter l₁ l₂ instance [decidable_eq α] : has_inter (list α) := ⟨list.inter⟩ def length : list α → nat | [] := 0 | (a :: l) := length l + 1 def empty : list α → bool | [] := tt | (_ :: _) := ff open option nat def nth : list α → nat → option α | [] n := none | (a :: l) 0 := some a | (a :: l) (n+1) := nth l n def update_nth : list α → ℕ → α → list α | (x::xs) 0 a := a :: xs | (x::xs) (i+1) a := x :: update_nth xs i a | [] _ _ := [] def remove_nth : list α → ℕ → list α | [] _ := [] | (x::xs) 0 := xs | (x::xs) (i+1) := x :: remove_nth xs i def head [inhabited α] : list α → α | [] := default α | (a :: l) := a def tail : list α → list α | [] := [] | (a :: l) := l def reverse_core : list α → list α → list α | [] r := r | (a::l) r := reverse_core l (a::r) def reverse : list α → list α := λ l, reverse_core l [] def map (f : α → β) : list α → list β | [] := [] | (a :: l) := f a :: map l def for : list α → (α → β) → list β := flip map def join : list (list α) → list α | [] := [] | (l :: ls) := append l (join ls) def filter (p : α → Prop) [decidable_pred p] : list α → list α | [] := [] | (a::l) := if p a then a :: filter l else filter l def dropn : ℕ → list α → list α | 0 a := a | (succ n) [] := [] | (succ n) (x::r) := dropn n r def taken : ℕ → list α → list α | 0 a := [] | (succ n) [] := [] | (succ n) (x :: r) := x :: taken n r definition foldl (f : α → β → α) : α → list β → α | a [] := a | a (b :: l) := foldl (f a b) l definition foldr (f : α → β → β) : β → list α → β | b [] := b | b (a :: l) := f a (foldr b l) definition any (l : list α) (p : α → bool) : bool := foldr (λ a r, p a || r) ff l definition all (l : list α) (p : α → bool) : bool := foldr (λ a r, p a && r) tt l def bor (l : list bool) : bool := any l id def band (l : list bool) : bool := all l id def zip_with (f : α → β → γ) : list α → list β → list γ | (x::xs) (y::ys) := f x y :: zip_with xs ys | _ _ := [] def zip : list α → list β → list (prod α β) := zip_with prod.mk def repeat (a : α) : ℕ → list α | 0 := [] | (succ n) := a :: repeat n def range_core : ℕ → list ℕ → list ℕ | 0 l := l | (succ n) l := range_core n (n :: l) def range (n : ℕ) : list ℕ := range_core n [] def iota_core : ℕ → list ℕ → list ℕ | 0 l := reverse l | (succ n) l := iota_core n (succ n :: l) def iota : ℕ → list ℕ := λ n, iota_core n [] def sum [has_add α] [has_zero α] : list α → α := foldl add zero end list