/- Copyright (c) 2015 Microsoft Corporation. All rights reserved. Released under Apache 2.0 license as described in the file LICENSE. Author: Leonardo de Moura -/ open nat function option universes u v w def stream (α : Type u) := nat → α namespace stream variables {α : Type u} {β : Type v} {δ : Type w} def cons (a : α) (s : stream α) : stream α := λ i, match i with | 0 := a | succ n := s n end notation h :: t := cons h t @[reducible] def head (s : stream α) : α := s 0 def tail (s : stream α) : stream α := λ i, s (i+1) def drop (n : nat) (s : stream α) : stream α := λ i, s (i+n) @[reducible] def nth (n : nat) (s : stream α) : α := s n protected lemma eta (s : stream α) : head s :: tail s = s := funext (λ i, begin cases i, repeat {reflexivity} end) lemma nth_zero_cons (a : α) (s : stream α) : nth 0 (a :: s) = a := rfl lemma head_cons (a : α) (s : stream α) : head (a :: s) = a := rfl lemma tail_cons (a : α) (s : stream α) : tail (a :: s) = s := rfl lemma tail_drop (n : nat) (s : stream α) : tail (drop n s) = drop n (tail s) := funext (λ i, begin unfold tail drop, simp end) lemma nth_drop (n m : nat) (s : stream α) : nth n (drop m s) = nth (n+m) s := rfl lemma tail_eq_drop (s : stream α) : tail s = drop 1 s := rfl lemma drop_drop (n m : nat) (s : stream α) : drop n (drop m s) = drop (n+m) s := funext (λ i, begin unfold drop, rw add_assoc end) lemma nth_succ (n : nat) (s : stream α) : nth (succ n) s = nth n (tail s) := rfl lemma drop_succ (n : nat) (s : stream α) : drop (succ n) s = drop n (tail s) := rfl protected lemma ext {s₁ s₂ : stream α} : (∀ n, nth n s₁ = nth n s₂) → s₁ = s₂ := assume h, funext h def all (p : α → Prop) (s : stream α) := ∀ n, p (nth n s) def any (p : α → Prop) (s : stream α) := ∃ n, p (nth n s) lemma all_def (p : α → Prop) (s : stream α) : all p s = ∀ n, p (nth n s) := rfl lemma any_def (p : α → Prop) (s : stream α) : any p s = ∃ n, p (nth n s) := rfl protected def mem (a : α) (s : stream α) := any (λ b, a = b) s instance : has_mem α (stream α) := ⟨stream.mem⟩ lemma mem_cons (a : α) (s : stream α) : a ∈ (a::s) := exists.intro 0 rfl lemma mem_cons_of_mem {a : α} {s : stream α} (b : α) : a ∈ s → a ∈ b :: s := assume ⟨n, h⟩, exists.intro (succ n) (by rw [nth_succ, tail_cons, h]) lemma eq_or_mem_of_mem_cons {a b : α} {s : stream α} : a ∈ b::s → a = b ∨ a ∈ s := assume ⟨n, h⟩, begin cases n with n', {left, exact h}, {right, rw [nth_succ, tail_cons] at h, exact ⟨n', h⟩} end lemma mem_of_nth_eq {n : nat} {s : stream α} {a : α} : a = nth n s → a ∈ s := assume h, exists.intro n h section map variable (f : α → β) def map (s : stream α) : stream β := λ n, f (nth n s) lemma drop_map (n : nat) (s : stream α) : drop n (map f s) = map f (drop n s) := stream.ext (λ i, rfl) lemma nth_map (n : nat) (s : stream α) : nth n (map f s) = f (nth n s) := rfl lemma tail_map (s : stream α) : tail (map f s) = map f (tail s) := begin rw tail_eq_drop, reflexivity end lemma head_map (s : stream α) : head (map f s) = f (head s) := rfl lemma map_eq (s : stream α) : map f s = f (head s) :: map f (tail s) := by rw [-stream.eta (map f s), tail_map, head_map] lemma map_cons (a : α) (s : stream α) : map f (a :: s) = f a :: map f s := begin rw [-stream.eta (map f (a :: s)), map_eq], reflexivity end lemma map_id (s : stream α) : map id s = s := rfl lemma map_map (g : β → δ) (f : α → β) (s : stream α) : map g (map f s) = map (g ∘ f) s := rfl lemma mem_map {a : α} {s : stream α} : a ∈ s → f a ∈ map f s := assume ⟨n, h⟩, exists.intro n (by rw [nth_map, h]) end map section zip variable (f : α → β → δ) def zip (s₁ : stream α) (s₂ : stream β) : stream δ := λ n, f (nth n s₁) (nth n s₂) lemma drop_zip (n : nat) (s₁ : stream α) (s₂ : stream β) : drop n (zip f s₁ s₂) = zip f (drop n s₁) (drop n s₂) := stream.ext (λ i, rfl) lemma nth_zip (n : nat) (s₁ : stream α) (s₂ : stream β) : nth n (zip f s₁ s₂) = f (nth n s₁) (nth n s₂) := rfl lemma head_zip (s₁ : stream α) (s₂ : stream β) : head (zip f s₁ s₂) = f (head s₁) (head s₂) := rfl lemma tail_zip (s₁ : stream α) (s₂ : stream β) : tail (zip f s₁ s₂) = zip f (tail s₁) (tail s₂) := rfl lemma zip_eq (s₁ : stream α) (s₂ : stream β) : zip f s₁ s₂ = f (head s₁) (head s₂) :: zip f (tail s₁) (tail s₂) := begin rw [-stream.eta (zip f s₁ s₂)], reflexivity end end zip def const (a : α) : stream α := λ n, a lemma mem_const (a : α) : a ∈ const a := exists.intro 0 rfl lemma const_eq (a : α) : const a = a :: const a := begin apply stream.ext, intro n, cases n, repeat {reflexivity} end lemma tail_const (a : α) : tail (const a) = const a := suffices tail (a :: const a) = const a, by rwa -const_eq at this, rfl lemma map_const (f : α → β) (a : α) : map f (const a) = const (f a) := rfl lemma nth_const (n : nat) (a : α) : nth n (const a) = a := rfl lemma drop_const (n : nat) (a : α) : drop n (const a) = const a := stream.ext (λ i, rfl) def iterate (f : α → α) (a : α) : stream α := λ n, nat.rec_on n a (λ n r, f r) lemma head_iterate (f : α → α) (a : α) : head (iterate f a) = a := rfl lemma tail_iterate (f : α → α) (a : α) : tail (iterate f a) = iterate f (f a) := begin apply funext, intro n, induction n with n' ih, {reflexivity}, {unfold tail iterate, unfold tail iterate at ih, rw add_one_eq_succ at ih, dsimp at ih, rw add_one_eq_succ, dsimp, rw ih} end lemma iterate_eq (f : α → α) (a : α) : iterate f a = a :: iterate f (f a) := begin rw [-stream.eta (iterate f a)], rw tail_iterate, reflexivity end lemma nth_zero_iterate (f : α → α) (a : α) : nth 0 (iterate f a) = a := rfl lemma nth_succ_iterate (n : nat) (f : α → α) (a : α) : nth (succ n) (iterate f a) = nth n (iterate f (f a)) := by rw [nth_succ, tail_iterate] section bisim variable (R : stream α → stream α → Prop) local infix ~ := R def is_bisimulation := ∀ ⦃s₁ s₂⦄, s₁ ~ s₂ → head s₁ = head s₂ ∧ tail s₁ ~ tail s₂ lemma nth_of_bisim (bisim : is_bisimulation R) : ∀ {s₁ s₂} n, s₁ ~ s₂ → nth n s₁ = nth n s₂ ∧ drop (n+1) s₁ ~ drop (n+1) s₂ | s₁ s₂ 0 h := bisim h | s₁ s₂ (n+1) h := match bisim h with | ⟨h₁, trel⟩ := nth_of_bisim n trel end -- If two streams are bisimilar, then they are equal lemma eq_of_bisim (bisim : is_bisimulation R) : ∀ {s₁ s₂}, s₁ ~ s₂ → s₁ = s₂ := λ s₁ s₂ r, stream.ext (λ n, and.elim_left (nth_of_bisim R bisim n r)) end bisim lemma bisim_simple (s₁ s₂ : stream α) : head s₁ = head s₂ → s₁ = tail s₁ → s₂ = tail s₂ → s₁ = s₂ := assume hh ht₁ ht₂, eq_of_bisim (λ s₁ s₂, head s₁ = head s₂ ∧ s₁ = tail s₁ ∧ s₂ = tail s₂) (λ s₁ s₂ ⟨h₁, h₂, h₃⟩, begin constructor, exact h₁, rw [-h₂, -h₃], repeat {constructor, repeat {assumption}} end) (and.intro hh (and.intro ht₁ ht₂)) lemma coinduction {s₁ s₂ : stream α} : head s₁ = head s₂ → (∀ (β : Type u) (fr : stream α → β), fr s₁ = fr s₂ → fr (tail s₁) = fr (tail s₂)) → s₁ = s₂ := assume hh ht, eq_of_bisim (λ s₁ s₂, head s₁ = head s₂ ∧ ∀ (β : Type u) (fr : stream α → β), fr s₁ = fr s₂ → fr (tail s₁) = fr (tail s₂)) (λ s₁ s₂ h, have h₁ : head s₁ = head s₂, from and.elim_left h, have h₂ : head (tail s₁) = head (tail s₂), from and.elim_right h α (@head α) h₁, have h₃ : ∀ (β : Type u) (fr : stream α → β), fr (tail s₁) = fr (tail s₂) → fr (tail (tail s₁)) = fr (tail (tail s₂)), from λ β fr, and.elim_right h β (λ s, fr (tail s)), and.intro h₁ (and.intro h₂ h₃)) (and.intro hh ht) lemma iterate_id (a : α) : iterate id a = const a := coinduction rfl (λ β fr ch, begin rw [tail_iterate, tail_const], exact ch end) local attribute [reducible] stream lemma map_iterate (f : α → α) (a : α) : iterate f (f a) = map f (iterate f a) := begin apply funext, intro n, induction n with n' ih, {reflexivity}, { unfold map iterate nth, dsimp, unfold map iterate nth at ih, dsimp at ih, rw ih } end section corec def corec (f : α → β) (g : α → α) : α → stream β := λ a, map f (iterate g a) def corec_on (a : α) (f : α → β) (g : α → α) : stream β := corec f g a lemma corec_def (f : α → β) (g : α → α) (a : α) : corec f g a = map f (iterate g a) := rfl lemma corec_eq (f : α → β) (g : α → α) (a : α) : corec f g a = f a :: corec f g (g a) := begin rw [corec_def, map_eq, head_iterate, tail_iterate], reflexivity end lemma corec_id_id_eq_const (a : α) : corec id id a = const a := by rw [corec_def, map_id, iterate_id] lemma corec_id_f_eq_iterate (f : α → α) (a : α) : corec id f a = iterate f a := rfl end corec -- corec is also known as unfold def unfolds (g : α → β) (f : α → α) (a : α) : stream β := corec g f a lemma unfolds_eq (g : α → β) (f : α → α) (a : α) : unfolds g f a = g a :: unfolds g f (f a) := begin unfold unfolds, rw [corec_eq] end lemma nth_unfolds_head_tail : ∀ (n : nat) (s : stream α), nth n (unfolds head tail s) = nth n s := begin intro n, induction n with n' ih, {intro s, reflexivity}, {intro s, rw [nth_succ, nth_succ, unfolds_eq, tail_cons, ih]} end lemma unfolds_head_eq : ∀ (s : stream α), unfolds head tail s = s := λ s, stream.ext (λ n, nth_unfolds_head_tail n s) def interleave (s₁ s₂ : stream α) : stream α := corec_on (s₁, s₂) (λ ⟨s₁, s₂⟩, head s₁) (λ ⟨s₁, s₂⟩, (s₂, tail s₁)) infix `⋈`:65 := interleave lemma interleave_eq (s₁ s₂ : stream α) : s₁ ⋈ s₂ = head s₁ :: head s₂ :: (tail s₁ ⋈ tail s₂) := begin unfold interleave corec_on, rw corec_eq, dsimp, rw corec_eq, reflexivity end lemma tail_interleave (s₁ s₂ : stream α) : tail (s₁ ⋈ s₂) = s₂ ⋈ (tail s₁) := begin unfold interleave corec_on, rw corec_eq, reflexivity end lemma interleave_tail_tail (s₁ s₂ : stream α) : tail s₁ ⋈ tail s₂ = tail (tail (s₁ ⋈ s₂)) := begin rw [interleave_eq s₁ s₂], reflexivity end lemma nth_interleave_left : ∀ (n : nat) (s₁ s₂ : stream α), nth (2*n) (s₁ ⋈ s₂) = nth n s₁ | 0 s₁ s₂ := rfl | (succ n) s₁ s₂ := begin change nth (succ (succ (2*n))) (s₁ ⋈ s₂) = nth (succ n) s₁, rw [nth_succ, nth_succ, interleave_eq, tail_cons, tail_cons, nth_interleave_left], reflexivity end lemma nth_interleave_right : ∀ (n : nat) (s₁ s₂ : stream α), nth (2*n+1) (s₁ ⋈ s₂) = nth n s₂ | 0 s₁ s₂ := rfl | (succ n) s₁ s₂ := begin change nth (succ (succ (2*n+1))) (s₁ ⋈ s₂) = nth (succ n) s₂, rw [nth_succ, nth_succ, interleave_eq, tail_cons, tail_cons, nth_interleave_right], reflexivity end lemma mem_interleave_left {a : α} {s₁ : stream α} (s₂ : stream α) : a ∈ s₁ → a ∈ s₁ ⋈ s₂ := assume ⟨n, h⟩, exists.intro (2*n) (by rw [h, nth_interleave_left]) lemma mem_interleave_right {a : α} {s₁ : stream α} (s₂ : stream α) : a ∈ s₂ → a ∈ s₁ ⋈ s₂ := assume ⟨n, h⟩, exists.intro (2*n+1) (by rw [h, nth_interleave_right]) def even (s : stream α) : stream α := corec (λ s, head s) (λ s, tail (tail s)) s def odd (s : stream α) : stream α := even (tail s) lemma odd_eq (s : stream α) : odd s = even (tail s) := rfl lemma head_even (s : stream α) : head (even s) = head s := rfl lemma tail_even (s : stream α) : tail (even s) = even (tail (tail s)) := begin unfold even, rw corec_eq, reflexivity end lemma even_cons_cons (a₁ a₂ : α) (s : stream α) : even (a₁ :: a₂ :: s) = a₁ :: even s := begin unfold even, rw corec_eq, reflexivity end lemma even_tail (s : stream α) : even (tail s) = odd s := rfl lemma even_interleave (s₁ s₂ : stream α) : even (s₁ ⋈ s₂) = s₁ := eq_of_bisim (λ s₁' s₁, ∃ s₂, s₁' = even (s₁ ⋈ s₂)) (λ s₁' s₁ ⟨s₂, h₁⟩, begin rw h₁, constructor, {reflexivity}, {exact ⟨tail s₂, by rw [interleave_eq, even_cons_cons, tail_cons]⟩} end) (exists.intro s₂ rfl) lemma interleave_even_odd (s₁ : stream α) : even s₁ ⋈ odd s₁ = s₁ := eq_of_bisim (λ s' s, s' = even s ⋈ odd s) (λ s' s (h : s' = even s ⋈ odd s), begin rw h, constructor, {reflexivity}, {dsimp, rw [odd_eq, odd_eq, tail_interleave, tail_even]} end) rfl lemma nth_even : ∀ (n : nat) (s : stream α), nth n (even s) = nth (2*n) s | 0 s := rfl | (succ n) s := begin change nth (succ n) (even s) = nth (succ (succ (2 * n))) s, rw [nth_succ, nth_succ, tail_even, nth_even], reflexivity end lemma nth_odd : ∀ (n : nat) (s : stream α), nth n (odd s) = nth (2*n + 1) s := λ n s, begin rw [odd_eq, nth_even], reflexivity end lemma mem_of_mem_even (a : α) (s : stream α) : a ∈ even s → a ∈ s := assume ⟨n, h⟩, exists.intro (2*n) (by rw [h, nth_even]) lemma mem_of_mem_odd (a : α) (s : stream α) : a ∈ odd s → a ∈ s := assume ⟨n, h⟩, exists.intro (2*n+1) (by rw [h, nth_odd]) def append_stream : list α → stream α → stream α | [] s := s | (list.cons a l) s := a :: append_stream l s lemma nil_append_stream (s : stream α) : append_stream [] s = s := rfl lemma cons_append_stream (a : α) (l : list α) (s : stream α) : append_stream (a::l) s = a :: append_stream l s := rfl infix `++ₛ`:65 := append_stream lemma append_append_stream : ∀ (l₁ l₂ : list α) (s : stream α), (l₁ ++ l₂) ++ₛ s = l₁ ++ₛ (l₂ ++ₛ s) | [] l₂ s := rfl | (list.cons a l₁) l₂ s := by rw [list.cons_append, cons_append_stream, cons_append_stream, append_append_stream] lemma map_append_stream (f : α → β) : ∀ (l : list α) (s : stream α), map f (l ++ₛ s) = list.map f l ++ₛ map f s | [] s := rfl | (list.cons a l) s := by rw [cons_append_stream, list.map_cons, map_cons, cons_append_stream, map_append_stream] lemma drop_append_stream : ∀ (l : list α) (s : stream α), drop l^.length (l ++ₛ s) = s | [] s := by reflexivity | (list.cons a l) s := by rw [list.length_cons, add_one_eq_succ, drop_succ, cons_append_stream, tail_cons, drop_append_stream] lemma append_stream_head_tail (s : stream α) : [head s] ++ₛ tail s = s := by rw [cons_append_stream, nil_append_stream, stream.eta] lemma mem_append_stream_right : ∀ {a : α} (l : list α) {s : stream α}, a ∈ s → a ∈ l ++ₛ s | a [] s h := h | a (list.cons b l) s h := have ih : a ∈ l ++ₛ s, from mem_append_stream_right l h, mem_cons_of_mem _ ih lemma mem_append_stream_left : ∀ {a : α} {l : list α} (s : stream α), a ∈ l → a ∈ l ++ₛ s | a [] s h := absurd h (list.not_mem_nil _) | a (list.cons b l) s h := or.elim (list.eq_or_mem_of_mem_cons h) (λ (aeqb : a = b), exists.intro 0 aeqb) (λ (ainl : a ∈ l), mem_cons_of_mem b (mem_append_stream_left s ainl)) def approx : nat → stream α → list α | 0 s := [] | (n+1) s := list.cons (head s) (approx n (tail s)) lemma approx_zero (s : stream α) : approx 0 s = [] := rfl lemma approx_succ (n : nat) (s : stream α) : approx (succ n) s = head s :: approx n (tail s) := rfl lemma nth_approx : ∀ (n : nat) (s : stream α), list.nth (approx (succ n) s) n = some (nth n s) | 0 s := rfl | (n+1) s := begin rw [approx_succ, add_one_eq_succ, list.nth_succ, nth_approx], reflexivity end lemma append_approx_drop : ∀ (n : nat) (s : stream α), append_stream (approx n s) (drop n s) = s := begin intro n, induction n with n' ih, {intro s, reflexivity}, {intro s, rw [approx_succ, drop_succ, cons_append_stream, ih (tail s), stream.eta]} end -- Take lemma reduces a proof of equality of infinite streams to an -- induction over all their finite approximations. lemma take_lemma (s₁ s₂ : stream α) : (∀ (n : nat), approx n s₁ = approx n s₂) → s₁ = s₂ := begin intro h, apply stream.ext, intro n, induction n with n ih, {note aux := h 1, unfold approx at aux, injection aux with aux, exact aux}, {assert h₁ : some (nth (succ n) s₁) = some (nth (succ n) s₂), {rw [-nth_approx, -nth_approx, h (succ (succ n))]}, injection h₁, assumption} end -- auxiliary def for cycle corecursive def private def cycle_f : α × list α × α × list α → α | (v, _, _, _) := v -- auxiliary def for cycle corecursive def private def cycle_g : α × list α × α × list α → α × list α × α × list α | (v₁, [], v₀, l₀) := (v₀, l₀, v₀, l₀) | (v₁, list.cons v₂ l₂, v₀, l₀) := (v₂, l₂, v₀, l₀) private lemma cycle_g_cons (a : α) (a₁ : α) (l₁ : list α) (a₀ : α) (l₀ : list α) : cycle_g (a, a₁::l₁, a₀, l₀) = (a₁, l₁, a₀, l₀) := rfl def cycle : Π (l : list α), l ≠ [] → stream α | [] h := absurd rfl h | (list.cons a l) h := corec cycle_f cycle_g (a, l, a, l) lemma cycle_eq : ∀ (l : list α) (h : l ≠ []), cycle l h = l ++ₛ cycle l h | [] h := absurd rfl h | (list.cons a l) h := have gen : ∀ l' a', corec cycle_f cycle_g (a', l', a, l) = (a' :: l') ++ₛ corec cycle_f cycle_g (a, l, a, l), begin intro l', induction l' with a₁ l₁ ih, {intros, rw [corec_eq], reflexivity}, {intros, rw [corec_eq, cycle_g_cons, ih a₁], reflexivity} end, gen l a lemma mem_cycle {a : α} {l : list α} : ∀ (h : l ≠ []), a ∈ l → a ∈ cycle l h := assume h ainl, begin rw [cycle_eq], exact mem_append_stream_left _ ainl end lemma cycle_singleton (a : α) (h : [a] ≠ []) : cycle [a] h = const a := coinduction rfl (λ β fr ch, by rwa [cycle_eq, const_eq]) def tails (s : stream α) : stream (stream α) := corec id tail (tail s) lemma tails_eq (s : stream α) : tails s = tail s :: tails (tail s) := by unfold tails; rw [corec_eq]; reflexivity lemma nth_tails : ∀ (n : nat) (s : stream α), nth n (tails s) = drop n (tail s) := begin intro n, induction n with n' ih, {intros, reflexivity}, {intro s, rw [nth_succ, drop_succ, tails_eq, tail_cons, ih]} end lemma tails_eq_iterate (s : stream α) : tails s = iterate tail (tail s) := rfl def inits_core (l : list α) (s : stream α) : stream (list α) := corec_on (l, s) (λ ⟨a, b⟩, a) (λ p, match p with (l', s') := (l' ++ [head s'], tail s') end) def inits (s : stream α) : stream (list α) := inits_core [head s] (tail s) lemma inits_core_eq (l : list α) (s : stream α) : inits_core l s = l :: inits_core (l ++ [head s]) (tail s) := begin unfold inits_core corec_on, rw [corec_eq], reflexivity end lemma tail_inits (s : stream α) : tail (inits s) = inits_core [head s, head (tail s)] (tail (tail s)) := begin unfold inits, rw inits_core_eq, reflexivity end lemma inits_tail (s : stream α) : inits (tail s) = inits_core [head (tail s)] (tail (tail s)) := rfl lemma cons_nth_inits_core : ∀ (a : α) (n : nat) (l : list α) (s : stream α), a :: nth n (inits_core l s) = nth n (inits_core (a::l) s) := begin intros a n, induction n with n' ih, {intros, reflexivity}, {intros l s, rw [nth_succ, inits_core_eq, tail_cons, ih, inits_core_eq (a::l) s], reflexivity } end lemma nth_inits : ∀ (n : nat) (s : stream α), nth n (inits s) = approx (succ n) s := begin intro n, induction n with n' ih, {intros, reflexivity}, {intros, rw [nth_succ, approx_succ, -ih, tail_inits, inits_tail, cons_nth_inits_core]} end lemma inits_eq (s : stream α) : inits s = [head s] :: map (list.cons (head s)) (inits (tail s)) := begin apply stream.ext, intro n, cases n, {reflexivity}, {rw [nth_inits, nth_succ, tail_cons, nth_map, nth_inits], reflexivity} end lemma zip_inits_tails (s : stream α) : zip append_stream (inits s) (tails s) = const s := begin apply stream.ext, intro n, rw [nth_zip, nth_inits, nth_tails, nth_const, approx_succ, cons_append_stream, append_approx_drop, stream.eta] end def pure (a : α) : stream α := const a def apply (f : stream (α → β)) (s : stream α) : stream β := λ n, (nth n f) (nth n s) infix `⊛`:75 := apply -- input as \o* lemma identity (s : stream α) : pure id ⊛ s = s := rfl lemma composition (g : stream (β → δ)) (f : stream (α → β)) (s : stream α) : pure comp ⊛ g ⊛ f ⊛ s = g ⊛ (f ⊛ s) := rfl lemma homomorphism (f : α → β) (a : α) : pure f ⊛ pure a = pure (f a) := rfl lemma interchange (fs : stream (α → β)) (a : α) : fs ⊛ pure a = pure (λ f : α → β, f a) ⊛ fs := rfl lemma map_eq_apply (f : α → β) (s : stream α) : map f s = pure f ⊛ s := rfl def nats : stream nat := λ n, n lemma nth_nats (n : nat) : nth n nats = n := rfl lemma nats_eq : nats = 0 :: map succ nats := begin apply stream.ext, intro n, cases n, reflexivity, rw [nth_succ], reflexivity end end stream