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|
import Lean
import Lean.Meta.Tactic.Simp
import Init.Data.List.Basic
import Mathlib.Tactic.RunCmd
import Mathlib.Tactic.Linarith
import Base.Primitives.Base
import Base.Arith.Base
/- TODO: this is very useful, but is there more? -/
set_option profiler true
set_option profiler.threshold 100
namespace Diverge
namespace Fix
open Primitives
open Result
variable {a : Type u} {b : a → Type v}
variable {c d : Type w} -- TODO: why do we have to make them both : Type w?
/-! # The least fixed point definition and its properties -/
def least_p (p : Nat → Prop) (n : Nat) : Prop := p n ∧ (∀ m, m < n → ¬ p m)
noncomputable def least (p : Nat → Prop) : Nat :=
Classical.epsilon (least_p p)
-- Auxiliary theorem for [least_spec]: if there exists an `n` satisfying `p`,
-- there there exists a least `m` satisfying `p`.
theorem least_spec_aux (p : Nat → Prop) : ∀ (n : Nat), (hn : p n) → ∃ m, least_p p m := by
apply Nat.strongRec'
intros n hi hn
-- Case disjunction on: is n the smallest n satisfying p?
match Classical.em (∀ m, m < n → ¬ p m) with
| .inl hlt =>
-- Yes: trivial
exists n
| .inr hlt =>
simp at *
let ⟨ m, ⟨ hmlt, hm ⟩ ⟩ := hlt
have hi := hi m hmlt hm
apply hi
-- The specification of [least]: either `p` is never satisfied, or it is satisfied
-- by `least p` and no `n < least p` satisfies `p`.
theorem least_spec (p : Nat → Prop) : (∀ n, ¬ p n) ∨ (p (least p) ∧ ∀ n, n < least p → ¬ p n) := by
-- Case disjunction on the existence of an `n` which satisfies `p`
match Classical.em (∀ n, ¬ p n) with
| .inl h =>
-- There doesn't exist: trivial
apply (Or.inl h)
| .inr h =>
-- There exists: we simply use `least_spec_aux` in combination with the property
-- of the epsilon operator
simp at *
let ⟨ n, hn ⟩ := h
apply Or.inr
have hl := least_spec_aux p n hn
have he := Classical.epsilon_spec hl
apply he
/-! # The fixed point definitions -/
def fix_fuel (n : Nat) (f : ((x:a) → Result (b x)) → (x:a) → Result (b x)) (x : a) :
Result (b x) :=
match n with
| 0 => .div
| n + 1 =>
f (fix_fuel n f) x
@[simp] def fix_fuel_pred (f : ((x:a) → Result (b x)) → (x:a) → Result (b x))
(x : a) (n : Nat) :=
not (div? (fix_fuel n f x))
def fix_fuel_P (f : ((x:a) → Result (b x)) → (x:a) → Result (b x))
(x : a) (n : Nat) : Prop :=
fix_fuel_pred f x n
partial
def fixImpl (f : ((x:a) → Result (b x)) → (x:a) → Result (b x)) (x : a) : Result (b x) :=
f (fixImpl f) x
-- The fact that `fix` is implemented by `fixImpl` allows us to not mark the
-- functions defined with the fixed-point as noncomputable. One big advantage
-- is that it allows us to evaluate those functions, for instance with #eval.
@[implemented_by fixImpl]
def fix (f : ((x:a) → Result (b x)) → (x:a) → Result (b x)) (x : a) : Result (b x) :=
fix_fuel (least (fix_fuel_P f x)) f x
/-! # The validity property -/
-- Monotonicity relation over results
-- TODO: generalize (we should parameterize the definition by a relation over `a`)
def result_rel {a : Type u} (x1 x2 : Result a) : Prop :=
match x1 with
| div => True
| fail _ => x2 = x1
| ret _ => x2 = x1 -- TODO: generalize
-- Monotonicity relation over monadic arrows (i.e., Kleisli arrows)
def karrow_rel (k1 k2 : (x:a) → Result (b x)) : Prop :=
∀ x, result_rel (k1 x) (k2 x)
-- Monotonicity property for function bodies
def is_mono (f : ((x:a) → Result (b x)) → (x:a) → Result (b x)) : Prop :=
∀ {{k1 k2}}, karrow_rel k1 k2 → karrow_rel (f k1) (f k2)
-- "Continuity" property.
-- We need this, and this looks a lot like continuity. Also see this paper:
-- https://inria.hal.science/file/index/docid/216187/filename/tarski.pdf
-- We define our "continuity" criteria so that it gives us what we need to
-- prove the fixed-point equation, and we can also easily manipulate it.
def is_cont (f : ((x:a) → Result (b x)) → (x:a) → Result (b x)) : Prop :=
∀ x, (Hdiv : ∀ n, fix_fuel (.succ n) f x = div) → f (fix f) x = div
/-! # The proof of the fixed-point equation -/
theorem fix_fuel_mono {f : ((x:a) → Result (b x)) → (x:a) → Result (b x)}
(Hmono : is_mono f) :
∀ {{n m}}, n ≤ m → karrow_rel (fix_fuel n f) (fix_fuel m f) := by
intros n
induction n
case zero => simp [karrow_rel, fix_fuel, result_rel]
case succ n1 Hi =>
intros m Hle x
simp [result_rel]
match m with
| 0 =>
exfalso
zify at *
linarith
| Nat.succ m1 =>
simp_arith at Hle
simp [fix_fuel]
have Hi := Hi Hle
have Hmono := Hmono Hi x
simp [result_rel] at Hmono
apply Hmono
@[simp] theorem neg_fix_fuel_P
{f : ((x:a) → Result (b x)) → (x:a) → Result (b x)} {x : a} {n : Nat} :
¬ fix_fuel_P f x n ↔ (fix_fuel n f x = div) := by
simp [fix_fuel_P, div?]
cases fix_fuel n f x <;> simp
theorem fix_fuel_fix_mono {f : ((x:a) → Result (b x)) → (x:a) → Result (b x)} (Hmono : is_mono f) :
∀ n, karrow_rel (fix_fuel n f) (fix f) := by
intros n x
simp [result_rel]
have Hl := least_spec (fix_fuel_P f x)
simp at Hl
match Hl with
| .inl Hl => simp [*]
| .inr ⟨ Hl, Hn ⟩ =>
match Classical.em (fix_fuel n f x = div) with
| .inl Hd =>
simp [*]
| .inr Hd =>
have Hineq : least (fix_fuel_P f x) ≤ n := by
-- Proof by contradiction
cases Classical.em (least (fix_fuel_P f x) ≤ n) <;> simp [*]
simp at *
rename_i Hineq
have Hn := Hn n Hineq
contradiction
have Hfix : ¬ (fix f x = div) := by
simp [fix]
-- By property of the least upper bound
revert Hd Hl
-- TODO: there is no conversion to select the head of a function!
conv => lhs; apply congr_fun; apply congr_fun; apply congr_fun; simp [fix_fuel_P, div?]
cases fix_fuel (least (fix_fuel_P f x)) f x <;> simp
have Hmono := fix_fuel_mono Hmono Hineq x
simp [result_rel] at Hmono
simp [fix] at *
cases Heq: fix_fuel (least (fix_fuel_P f x)) f x <;>
cases Heq':fix_fuel n f x <;>
simp_all
theorem fix_fuel_P_least {f : ((x:a) → Result (b x)) → (x:a) → Result (b x)} (Hmono : is_mono f) :
∀ {{x n}}, fix_fuel_P f x n → fix_fuel_P f x (least (fix_fuel_P f x)) := by
intros x n Hf
have Hfmono := fix_fuel_fix_mono Hmono n x
-- TODO: there is no conversion to select the head of a function!
conv => apply congr_fun; simp [fix_fuel_P]
simp [fix_fuel_P] at Hf
revert Hf Hfmono
simp [div?, result_rel, fix]
cases fix_fuel n f x <;> simp_all
-- Prove the fixed point equation in the case there exists some fuel for which
-- the execution terminates
theorem fix_fixed_eq_terminates (f : ((x:a) → Result (b x)) → (x:a) → Result (b x)) (Hmono : is_mono f)
(x : a) (n : Nat) (He : fix_fuel_P f x n) :
fix f x = f (fix f) x := by
have Hl := fix_fuel_P_least Hmono He
-- TODO: better control of simplification
conv at Hl =>
apply congr_fun
simp [fix_fuel_P]
-- The least upper bound is > 0
have ⟨ n, Hsucc ⟩ : ∃ n, least (fix_fuel_P f x) = Nat.succ n := by
revert Hl
simp [div?]
cases least (fix_fuel_P f x) <;> simp [fix_fuel]
simp [Hsucc] at Hl
revert Hl
simp [*, div?, fix, fix_fuel]
-- Use the monotonicity
have Hfixmono := fix_fuel_fix_mono Hmono n
have Hvm := Hmono Hfixmono x
-- Use functional extensionality
simp [result_rel, fix] at Hvm
revert Hvm
split <;> simp [*] <;> intros <;> simp [*]
theorem fix_fixed_eq_forall {{f : ((x:a) → Result (b x)) → (x:a) → Result (b x)}}
(Hmono : is_mono f) (Hcont : is_cont f) :
∀ x, fix f x = f (fix f) x := by
intros x
-- Case disjunction: is there a fuel such that the execution successfully execute?
match Classical.em (∃ n, fix_fuel_P f x n) with
| .inr He =>
-- No fuel: the fixed point evaluates to `div`
--simp [fix] at *
simp at *
conv => lhs; simp [fix]
have Hel := He (Nat.succ (least (fix_fuel_P f x))); simp [*, fix_fuel] at *; clear Hel
-- Use the "continuity" of `f`
have He : ∀ n, fix_fuel (.succ n) f x = div := by intros; simp [*]
have Hcont := Hcont x He
simp [Hcont]
| .inl ⟨ n, He ⟩ => apply fix_fixed_eq_terminates f Hmono x n He
-- The final fixed point equation
theorem fix_fixed_eq {{f : ((x:a) → Result (b x)) → (x:a) → Result (b x)}}
(Hmono : is_mono f) (Hcont : is_cont f) :
fix f = f (fix f) := by
have Heq := fix_fixed_eq_forall Hmono Hcont
have Heq1 : fix f = (λ x => fix f x) := by simp
rw [Heq1]
conv => lhs; ext; simp [Heq]
/-! # Making the proofs of validity manageable (and automatable) -/
-- Monotonicity property for expressions
def is_mono_p (e : ((x:a) → Result (b x)) → Result c) : Prop :=
∀ {{k1 k2}}, karrow_rel k1 k2 → result_rel (e k1) (e k2)
theorem is_mono_p_same (x : Result c) :
@is_mono_p a b c (λ _ => x) := by
simp [is_mono_p, karrow_rel, result_rel]
split <;> simp
theorem is_mono_p_rec (x : a) :
@is_mono_p a b (b x) (λ f => f x) := by
simp_all [is_mono_p, karrow_rel, result_rel]
-- The important lemma about `is_mono_p`
theorem is_mono_p_bind
(g : ((x:a) → Result (b x)) → Result c)
(h : c → ((x:a) → Result (b x)) → Result d) :
is_mono_p g →
(∀ y, is_mono_p (h y)) →
@is_mono_p a b d (λ k => @Bind.bind Result _ c d (g k) (fun y => h y k)) := by
-- @is_mono_p a b d (λ k => do let (y : c) ← g k; h y k) := by
intro hg hh
simp [is_mono_p]
intro fg fh Hrgh
simp [karrow_rel, result_rel]
have hg := hg Hrgh; simp [result_rel] at hg
cases heq0: g fg <;> simp_all
rename_i y _
have hh := hh y Hrgh; simp [result_rel] at hh
simp_all
-- Continuity property for expressions - note that we take the continuation
-- as parameter
def is_cont_p (k : ((x:a) → Result (b x)) → (x:a) → Result (b x))
(e : ((x:a) → Result (b x)) → Result c) : Prop :=
(Hc : ∀ n, e (fix_fuel n k) = .div) →
e (fix k) = .div
theorem is_cont_p_same (k : ((x:a) → Result (b x)) → (x:a) → Result (b x))
(x : Result c) :
is_cont_p k (λ _ => x) := by
simp [is_cont_p]
theorem is_cont_p_rec (f : ((x:a) → Result (b x)) → (x:a) → Result (b x)) (x : a) :
is_cont_p f (λ f => f x) := by
simp_all [is_cont_p, fix]
-- The important lemma about `is_cont_p`
theorem is_cont_p_bind
(k : ((x:a) → Result (b x)) → (x:a) → Result (b x))
(Hkmono : is_mono k)
(g : ((x:a) → Result (b x)) → Result c)
(h : c → ((x:a) → Result (b x)) → Result d) :
is_mono_p g →
is_cont_p k g →
(∀ y, is_mono_p (h y)) →
(∀ y, is_cont_p k (h y)) →
is_cont_p k (λ k => do let y ← g k; h y k) := by
intro Hgmono Hgcont Hhmono Hhcont
simp [is_cont_p]
intro Hdiv
-- Case on `g (fix... k)`: is there an n s.t. it terminates?
cases Classical.em (∀ n, g (fix_fuel n k) = .div) <;> rename_i Hn
. -- Case 1: g diverges
have Hgcont := Hgcont Hn
simp_all
. -- Case 2: g doesn't diverge
simp at Hn
let ⟨ n, Hn ⟩ := Hn
have Hdivn := Hdiv n
have Hffmono := fix_fuel_fix_mono Hkmono n
have Hgeq := Hgmono Hffmono
simp [result_rel] at Hgeq
cases Heq: g (fix_fuel n k) <;> rename_i y <;> simp_all
-- Remains the .ret case
-- Use Hdiv to prove that: ∀ n, h y (fix_fuel n f) = div
-- We do this in two steps: first we prove it for m ≥ n
have Hhdiv: ∀ m, h y (fix_fuel m k) = .div := by
have Hhdiv : ∀ m, n ≤ m → h y (fix_fuel m k) = .div := by
-- We use the fact that `g (fix_fuel n f) = .div`, combined with Hdiv
intro m Hle
have Hdivm := Hdiv m
-- Monotonicity of g
have Hffmono := fix_fuel_mono Hkmono Hle
have Hgmono := Hgmono Hffmono
-- We need to clear Hdiv because otherwise simp_all rewrites Hdivm with Hdiv
clear Hdiv
simp_all [result_rel]
intro m
-- TODO: we shouldn't need the excluded middle here because it is decidable
cases Classical.em (n ≤ m) <;> rename_i Hl
. apply Hhdiv; assumption
. simp at Hl
-- Make a case disjunction on `h y (fix_fuel m k)`: if it is not equal
-- to div, use the monotonicity of `h y`
have Hle : m ≤ n := by linarith
have Hffmono := fix_fuel_mono Hkmono Hle
have Hmono := Hhmono y Hffmono
simp [result_rel] at Hmono
cases Heq: h y (fix_fuel m k) <;> simp_all
-- We can now use the continuity hypothesis for h
apply Hhcont; assumption
-- The validity property for an expression
def is_valid_p (k : ((x:a) → Result (b x)) → (x:a) → Result (b x))
(e : ((x:a) → Result (b x)) → Result c) : Prop :=
is_mono_p e ∧
(is_mono k → is_cont_p k e)
@[simp] theorem is_valid_p_same
(k : ((x:a) → Result (b x)) → (x:a) → Result (b x)) (x : Result c) :
is_valid_p k (λ _ => x) := by
simp [is_valid_p, is_mono_p_same, is_cont_p_same]
@[simp] theorem is_valid_p_rec
(k : ((x:a) → Result (b x)) → (x:a) → Result (b x)) (x : a) :
is_valid_p k (λ k => k x) := by
simp_all [is_valid_p, is_mono_p_rec, is_cont_p_rec]
theorem is_valid_p_ite
(k : ((x:a) → Result (b x)) → (x:a) → Result (b x))
(cond : Prop) [h : Decidable cond]
{e1 e2 : ((x:a) → Result (b x)) → Result c}
(he1: is_valid_p k e1) (he2 : is_valid_p k e2) :
is_valid_p k (ite cond e1 e2) := by
split <;> assumption
theorem is_valid_p_dite
(k : ((x:a) → Result (b x)) → (x:a) → Result (b x))
(cond : Prop) [h : Decidable cond]
{e1 : cond → ((x:a) → Result (b x)) → Result c}
{e2 : Not cond → ((x:a) → Result (b x)) → Result c}
(he1: ∀ x, is_valid_p k (e1 x)) (he2 : ∀ x, is_valid_p k (e2 x)) :
is_valid_p k (dite cond e1 e2) := by
split <;> simp [*]
-- Lean is good at unification: we can write a very general version
-- (in particular, it will manage to figure out `g` and `h` when we
-- apply the lemma)
theorem is_valid_p_bind
{{k : ((x:a) → Result (b x)) → (x:a) → Result (b x)}}
{{g : ((x:a) → Result (b x)) → Result c}}
{{h : c → ((x:a) → Result (b x)) → Result d}}
(Hgvalid : is_valid_p k g)
(Hhvalid : ∀ y, is_valid_p k (h y)) :
is_valid_p k (λ k => do let y ← g k; h y k) := by
let ⟨ Hgmono, Hgcont ⟩ := Hgvalid
simp [is_valid_p, forall_and] at Hhvalid
have ⟨ Hhmono, Hhcont ⟩ := Hhvalid
simp [← imp_forall_iff] at Hhcont
simp [is_valid_p]; constructor
. -- Monotonicity
apply is_mono_p_bind <;> assumption
. -- Continuity
intro Hkmono
have Hgcont := Hgcont Hkmono
have Hhcont := Hhcont Hkmono
apply is_cont_p_bind <;> assumption
def is_valid (f : ((x:a) → Result (b x)) → (x:a) → Result (b x)) : Prop :=
∀ k x, is_valid_p k (λ k => f k x)
theorem is_valid_p_imp_is_valid {{f : ((x:a) → Result (b x)) → (x:a) → Result (b x)}}
(Hvalid : is_valid f) :
is_mono f ∧ is_cont f := by
have Hmono : is_mono f := by
intro f h Hr x
have Hmono := Hvalid (λ _ _ => .div) x
have Hmono := Hmono.left
apply Hmono; assumption
have Hcont : is_cont f := by
intro x Hdiv
have Hcont := (Hvalid f x).right Hmono
simp [is_cont_p] at Hcont
apply Hcont
intro n
have Hdiv := Hdiv n
simp [fix_fuel] at Hdiv
simp [*]
simp [*]
theorem is_valid_fix_fixed_eq {{f : ((x:a) → Result (b x)) → (x:a) → Result (b x)}}
(Hvalid : is_valid f) :
fix f = f (fix f) := by
have ⟨ Hmono, Hcont ⟩ := is_valid_p_imp_is_valid Hvalid
exact fix_fixed_eq Hmono Hcont
end Fix
namespace FixI
/- Indexed fixed-point: definitions with indexed types, convenient to use for mutually
recursive definitions. We simply port the definitions and proofs from Fix to a more
specific case.
-/
open Primitives Fix
-- The index type
variable {id : Type u}
-- The input/output types
variable {a : id → Type v} {b : (i:id) → a i → Type w}
-- Monotonicity relation over monadic arrows (i.e., Kleisli arrows)
def karrow_rel (k1 k2 : (i:id) → (x:a i) → Result (b i x)) : Prop :=
∀ i x, result_rel (k1 i x) (k2 i x)
def kk_to_gen (k : (i:id) → (x:a i) → Result (b i x)) :
(x: (i:id) × a i) → Result (b x.fst x.snd) :=
λ ⟨ i, x ⟩ => k i x
def kk_of_gen (k : (x: (i:id) × a i) → Result (b x.fst x.snd)) :
(i:id) → (x:a i) → Result (b i x) :=
λ i x => k ⟨ i, x ⟩
def k_to_gen (k : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x)) :
((x: (i:id) × a i) → Result (b x.fst x.snd)) → (x: (i:id) × a i) → Result (b x.fst x.snd) :=
λ kk => kk_to_gen (k (kk_of_gen kk))
def k_of_gen (k : ((x: (i:id) × a i) → Result (b x.fst x.snd)) → (x: (i:id) × a i) → Result (b x.fst x.snd)) :
((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x) :=
λ kk => kk_of_gen (k (kk_to_gen kk))
def e_to_gen (e : ((i:id) → (x:a i) → Result (b i x)) → Result c) :
((x: (i:id) × a i) → Result (b x.fst x.snd)) → Result c :=
λ k => e (kk_of_gen k)
def is_valid_p (k : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x))
(e : ((i:id) → (x:a i) → Result (b i x)) → Result c) : Prop :=
Fix.is_valid_p (k_to_gen k) (e_to_gen e)
def is_valid (f : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x)) : Prop :=
∀ k i x, is_valid_p k (λ k => f k i x)
def fix
(f : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x)) :
(i:id) → (x:a i) → Result (b i x) :=
kk_of_gen (Fix.fix (k_to_gen f))
theorem is_valid_fix_fixed_eq
{{f : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x)}}
(Hvalid : is_valid f) :
fix f = f (fix f) := by
have Hvalid' : Fix.is_valid (k_to_gen f) := by
intro k x
simp only [is_valid, is_valid_p] at Hvalid
let ⟨ i, x ⟩ := x
have Hvalid := Hvalid (k_of_gen k) i x
simp only [k_to_gen, k_of_gen, kk_to_gen, kk_of_gen] at Hvalid
refine Hvalid
have Heq := Fix.is_valid_fix_fixed_eq Hvalid'
simp [fix]
conv => lhs; rw [Heq]
/- Some utilities to define the mutually recursive functions -/
-- TODO: use more
abbrev kk_ty (id : Type u) (a : id → Type v) (b : (i:id) → (x:a i) → Type w) :=
(i:id) → (x:a i) → Result (b i x)
abbrev k_ty (id : Type u) (a : id → Type v) (b : (i:id) → (x:a i) → Type w) :=
kk_ty id a b → kk_ty id a b
abbrev in_out_ty : Type (imax (u + 1) (v + 1)) := (in_ty : Type u) × ((x:in_ty) → Type v)
-- TODO: remove?
abbrev mk_in_out_ty (in_ty : Type u) (out_ty : in_ty → Type v) :
in_out_ty :=
Sigma.mk in_ty out_ty
-- Initially, we had left out the parameters id, a and b.
-- However, by parameterizing Funs with those parameters, we can state
-- and prove lemmas like Funs.is_valid_p_is_valid_p
inductive Funs (id : Type u) (a : id → Type v) (b : (i:id) → (x:a i) → Type w) :
List in_out_ty.{v, w} → Type (max (u + 1) (max (v + 1) (w + 1))) :=
| Nil : Funs id a b []
| Cons {ity : Type v} {oty : ity → Type w} {tys : List in_out_ty}
(f : kk_ty id a b → (x:ity) → Result (oty x)) (tl : Funs id a b tys) :
Funs id a b (⟨ ity, oty ⟩ :: tys)
def get_fun {tys : List in_out_ty} (fl : Funs id a b tys) :
(i : Fin tys.length) → kk_ty id a b → (x : (tys.get i).fst) →
Result ((tys.get i).snd x) :=
match fl with
| .Nil => λ i => by have h:= i.isLt; simp at h
| @Funs.Cons id a b ity oty tys1 f tl =>
λ ⟨ i, iLt ⟩ =>
match i with
| 0 =>
Eq.mp (by simp [List.get]) f
| .succ j =>
have jLt: j < tys1.length := by
simp at iLt
revert iLt
simp_arith
let j: Fin tys1.length := ⟨ j, jLt ⟩
Eq.mp (by simp) (get_fun tl j)
def for_all_fin_aux {n : Nat} (f : Fin n → Prop) (m : Nat) (h : m ≤ n) : Prop :=
if heq: m = n then True
else
f ⟨ m, by simp_all [Nat.lt_iff_le_and_ne] ⟩ ∧
for_all_fin_aux f (m + 1) (by simp_all [Arith.add_one_le_iff_le_ne])
termination_by for_all_fin_aux n _ m h => n - m
decreasing_by
simp_wf
apply Nat.sub_add_lt_sub <;> simp
simp_all [Arith.add_one_le_iff_le_ne]
def for_all_fin {n : Nat} (f : Fin n → Prop) := for_all_fin_aux f 0 (by simp)
theorem for_all_fin_aux_imp_forall {n : Nat} (f : Fin n → Prop) (m : Nat) :
(h : m ≤ n) →
for_all_fin_aux f m h → ∀ i, m ≤ i.val → f i
:= by
generalize h: (n - m) = k
revert m
induction k -- TODO: induction h rather?
case zero =>
simp_all
intro m h1 h2
have h: n = m := by
linarith
unfold for_all_fin_aux; simp_all
simp_all
-- There is no i s.t. m ≤ i
intro i h3; cases i; simp_all
linarith
case succ k hi =>
simp_all
intro m hk hmn
intro hf i hmi
have hne: m ≠ n := by
have hineq := Nat.lt_of_sub_eq_succ hk
linarith
-- m = i?
if heq: m = i then
-- Yes: simply use the `for_all_fin_aux` hyp
unfold for_all_fin_aux at hf
simp_all
tauto
else
-- No: use the induction hypothesis
have hlt: m < i := by simp_all [Nat.lt_iff_le_and_ne]
have hineq: m + 1 ≤ n := by
have hineq := Nat.lt_of_sub_eq_succ hk
simp [*, Nat.add_one_le_iff]
have heq1: n - (m + 1) = k := by
-- TODO: very annoying arithmetic proof
simp [Nat.sub_eq_iff_eq_add hineq]
have hineq1: m ≤ n := by linarith
simp [Nat.sub_eq_iff_eq_add hineq1] at hk
simp_arith [hk]
have hi := hi (m + 1) heq1 hineq
apply hi <;> simp_all
. unfold for_all_fin_aux at hf
simp_all
. simp_all [Arith.add_one_le_iff_le_ne]
-- TODO: this is not necessary anymore
theorem for_all_fin_imp_forall (n : Nat) (f : Fin n → Prop) :
for_all_fin f → ∀ i, f i
:= by
intro Hf i
apply for_all_fin_aux_imp_forall <;> try assumption
simp
/- Automating the proofs -/
@[simp] theorem is_valid_p_same
(k : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x)) (x : Result c) :
is_valid_p k (λ _ => x) := by
simp [is_valid_p, k_to_gen, e_to_gen]
@[simp] theorem is_valid_p_rec
(k : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x)) (i : id) (x : a i) :
is_valid_p k (λ k => k i x) := by
simp [is_valid_p, k_to_gen, e_to_gen, kk_to_gen, kk_of_gen]
theorem is_valid_p_ite
(k : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x))
(cond : Prop) [h : Decidable cond]
{e1 e2 : ((i:id) → (x:a i) → Result (b i x)) → Result c}
(he1: is_valid_p k e1) (he2 : is_valid_p k e2) :
is_valid_p k (λ k => ite cond (e1 k) (e2 k)) := by
split <;> assumption
theorem is_valid_p_dite
(k : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x))
(cond : Prop) [h : Decidable cond]
{e1 : ((i:id) → (x:a i) → Result (b i x)) → cond → Result c}
{e2 : ((i:id) → (x:a i) → Result (b i x)) → Not cond → Result c}
(he1: ∀ x, is_valid_p k (λ k => e1 k x))
(he2 : ∀ x, is_valid_p k (λ k => e2 k x)) :
is_valid_p k (λ k => dite cond (e1 k) (e2 k)) := by
split <;> simp [*]
theorem is_valid_p_bind
{{k : ((i:id) → (x:a i) → Result (b i x)) → (i:id) → (x:a i) → Result (b i x)}}
{{g : ((i:id) → (x:a i) → Result (b i x)) → Result c}}
{{h : c → ((i:id) → (x:a i) → Result (b i x)) → Result d}}
(Hgvalid : is_valid_p k g)
(Hhvalid : ∀ y, is_valid_p k (h y)) :
is_valid_p k (λ k => do let y ← g k; h y k) := by
apply Fix.is_valid_p_bind
. apply Hgvalid
. apply Hhvalid
def Funs.is_valid_p
(k : k_ty id a b)
(fl : Funs id a b tys) :
Prop :=
match fl with
| .Nil => True
| .Cons f fl => (∀ x, FixI.is_valid_p k (λ k => f k x)) ∧ fl.is_valid_p k
theorem Funs.is_valid_p_Nil (k : k_ty id a b) :
Funs.is_valid_p k Funs.Nil := by simp [Funs.is_valid_p]
def Funs.is_valid_p_is_valid_p_aux
{k : k_ty id a b}
{tys : List in_out_ty}
(fl : Funs id a b tys) (Hvalid : is_valid_p k fl) :
∀ (i : Fin tys.length) (x : (tys.get i).fst), FixI.is_valid_p k (fun k => get_fun fl i k x) := by
-- Prepare the induction
have ⟨ n, Hn ⟩ : { n : Nat // tys.length = n } := ⟨ tys.length, by rfl ⟩
revert tys fl Hvalid
induction n
--
case zero =>
intro tys fl Hvalid Hlen;
have Heq: tys = [] := by cases tys <;> simp_all
intro i x
simp_all
have Hi := i.isLt
simp_all
case succ n Hn =>
intro tys fl Hvalid Hlen i x;
cases fl <;> simp at Hlen i x Hvalid
rename_i ity oty tys f fl
have ⟨ Hvf, Hvalid ⟩ := Hvalid
have Hvf1: is_valid_p k fl := by
simp [Hvalid, Funs.is_valid_p]
have Hn := @Hn tys fl Hvf1 (by simp [*])
-- Case disjunction on i
match i with
| ⟨ 0, _ ⟩ =>
simp at x
simp [get_fun]
apply (Hvf x)
| ⟨ .succ j, HiLt ⟩ =>
simp_arith at HiLt
simp at x
let j : Fin (List.length tys) := ⟨ j, by simp_arith [HiLt] ⟩
have Hn := Hn j x
apply Hn
def Funs.is_valid_p_is_valid_p
(tys : List in_out_ty)
(k : k_ty (Fin (List.length tys)) (λ i => (tys.get i).fst) (fun i x => (List.get tys i).snd x))
(fl : Funs (Fin tys.length) (λ i => (tys.get i).fst) (λ i x => (tys.get i).snd x) tys) :
fl.is_valid_p k →
∀ (i : Fin tys.length) (x : (tys.get i).fst),
FixI.is_valid_p k (fun k => get_fun fl i k x)
:= by
intro Hvalid
apply is_valid_p_is_valid_p_aux; simp [*]
end FixI
namespace Ex1
/- An example of use of the fixed-point -/
open Primitives Fix
variable {a : Type} (k : (List a × Int) → Result a)
def list_nth_body (x : (List a × Int)) : Result a :=
let (ls, i) := x
match ls with
| [] => .fail .panic
| hd :: tl =>
if i = 0 then .ret hd
else k (tl, i - 1)
theorem list_nth_body_is_valid: ∀ k x, is_valid_p k (λ k => @list_nth_body a k x) := by
intro k x
simp [list_nth_body]
split <;> simp
split <;> simp
def list_nth (ls : List a) (i : Int) : Result a := fix list_nth_body (ls, i)
-- The unfolding equation - diverges if `i < 0`
theorem list_nth_eq (ls : List a) (i : Int) :
list_nth ls i =
match ls with
| [] => .fail .panic
| hd :: tl =>
if i = 0 then .ret hd
else list_nth tl (i - 1)
:= by
have Heq := is_valid_fix_fixed_eq (@list_nth_body_is_valid a)
simp [list_nth]
conv => lhs; rw [Heq]
end Ex1
namespace Ex2
/- Same as Ex1, but we make the body of nth non tail-rec (this is mostly
to see what happens when there are let-bindings) -/
open Primitives Fix
variable {a : Type} (k : (List a × Int) → Result a)
def list_nth_body (x : (List a × Int)) : Result a :=
let (ls, i) := x
match ls with
| [] => .fail .panic
| hd :: tl =>
if i = 0 then .ret hd
else
do
let y ← k (tl, i - 1)
.ret y
theorem list_nth_body_is_valid: ∀ k x, is_valid_p k (λ k => @list_nth_body a k x) := by
intro k x
simp [list_nth_body]
split <;> simp
split <;> simp
apply is_valid_p_bind <;> intros <;> simp_all
def list_nth (ls : List a) (i : Int) : Result a := fix list_nth_body (ls, i)
-- The unfolding equation - diverges if `i < 0`
theorem list_nth_eq (ls : List a) (i : Int) :
(list_nth ls i =
match ls with
| [] => .fail .panic
| hd :: tl =>
if i = 0 then .ret hd
else
do
let y ← list_nth tl (i - 1)
.ret y)
:= by
have Heq := is_valid_fix_fixed_eq (@list_nth_body_is_valid a)
simp [list_nth]
conv => lhs; rw [Heq]
end Ex2
namespace Ex3
/- Mutually recursive functions - first encoding (see Ex4 for a better encoding) -/
open Primitives Fix
/- Because we have mutually recursive functions, we use a sum for the inputs
and the output types:
- inputs: the sum allows to select the function to call in the recursive
calls (and the functions may not have the same input types)
- outputs: this case is degenerate because `even` and `odd` have the same
return type `Bool`, but generally speaking we need a sum type because
the functions in the mutually recursive group may have different
return types.
-/
variable (k : (Int ⊕ Int) → Result (Bool ⊕ Bool))
def is_even_is_odd_body (x : (Int ⊕ Int)) : Result (Bool ⊕ Bool) :=
match x with
| .inl i =>
-- Body of `is_even`
if i = 0
then .ret (.inl true) -- We use .inl because this is `is_even`
else
do
let b ←
do
-- Call `odd`: we need to wrap the input value in `.inr`, then
-- extract the output value
let r ← k (.inr (i- 1))
match r with
| .inl _ => .fail .panic -- Invalid output
| .inr b => .ret b
-- Wrap the return value
.ret (.inl b)
| .inr i =>
-- Body of `is_odd`
if i = 0
then .ret (.inr false) -- We use .inr because this is `is_odd`
else
do
let b ←
do
-- Call `is_even`: we need to wrap the input value in .inr, then
-- extract the output value
let r ← k (.inl (i- 1))
match r with
| .inl b => .ret b
| .inr _ => .fail .panic -- Invalid output
-- Wrap the return value
.ret (.inr b)
theorem is_even_is_odd_body_is_valid:
∀ k x, is_valid_p k (λ k => is_even_is_odd_body k x) := by
intro k x
simp [is_even_is_odd_body]
split <;> simp <;> split <;> simp
apply is_valid_p_bind; simp
intros; split <;> simp
apply is_valid_p_bind; simp
intros; split <;> simp
def is_even (i : Int): Result Bool :=
do
let r ← fix is_even_is_odd_body (.inl i)
match r with
| .inl b => .ret b
| .inr _ => .fail .panic
def is_odd (i : Int): Result Bool :=
do
let r ← fix is_even_is_odd_body (.inr i)
match r with
| .inl _ => .fail .panic
| .inr b => .ret b
-- The unfolding equation for `is_even` - diverges if `i < 0`
theorem is_even_eq (i : Int) :
is_even i = (if i = 0 then .ret true else is_odd (i - 1))
:= by
have Heq := is_valid_fix_fixed_eq is_even_is_odd_body_is_valid
simp [is_even, is_odd]
conv => lhs; rw [Heq]; simp; rw [is_even_is_odd_body]; simp
-- Very annoying: we need to swap the matches
-- Doing this with rewriting lemmas is hard generally speaking
-- (especially as we may have to generate lemmas for user-defined
-- inductives on the fly).
-- The simplest is to repeatedly split then simplify (we identify
-- the outer match or monadic let-binding, and split on its scrutinee)
split <;> simp
cases H0 : fix is_even_is_odd_body (Sum.inr (i - 1)) <;> simp
rename_i v
split <;> simp
-- The unfolding equation for `is_odd` - diverges if `i < 0`
theorem is_odd_eq (i : Int) :
is_odd i = (if i = 0 then .ret false else is_even (i - 1))
:= by
have Heq := is_valid_fix_fixed_eq is_even_is_odd_body_is_valid
simp [is_even, is_odd]
conv => lhs; rw [Heq]; simp; rw [is_even_is_odd_body]; simp
-- Same remark as for `even`
split <;> simp
cases H0 : fix is_even_is_odd_body (Sum.inl (i - 1)) <;> simp
rename_i v
split <;> simp
end Ex3
namespace Ex4
/- Mutually recursive functions - 2nd encoding -/
open Primitives FixI
/- We make the input type and output types dependent on a parameter -/
@[simp] def tys : List in_out_ty := [mk_in_out_ty Int (λ _ => Bool), mk_in_out_ty Int (λ _ => Bool)]
@[simp] def input_ty (i : Fin 2) : Type := (tys.get i).fst
@[simp] def output_ty (i : Fin 2) (x : input_ty i) : Type :=
(tys.get i).snd x
/- The bodies are more natural -/
def is_even_body (k : (i : Fin 2) → (x : input_ty i) → Result (output_ty i x)) (i : Int) : Result Bool :=
if i = 0
then .ret true
else do
let b ← k 1 (i - 1)
.ret b
def is_odd_body (k : (i : Fin 2) → (x : input_ty i) → Result (output_ty i x)) (i : Int) : Result Bool :=
if i = 0
then .ret false
else do
let b ← k 0 (i - 1)
.ret b
@[simp] def bodies :
Funs (Fin 2) input_ty output_ty
[mk_in_out_ty Int (λ _ => Bool), mk_in_out_ty Int (λ _ => Bool)] :=
Funs.Cons (is_even_body) (Funs.Cons (is_odd_body) Funs.Nil)
def body (k : (i : Fin 2) → (x : input_ty i) → Result (output_ty i x)) (i: Fin 2) :
(x : input_ty i) → Result (output_ty i x) := get_fun bodies i k
theorem body_is_valid : is_valid body := by
-- Split the proof into proofs of validity of the individual bodies
rw [is_valid]
simp only [body]
intro k
apply (Funs.is_valid_p_is_valid_p tys)
simp [Funs.is_valid_p]
(repeat (apply And.intro)) <;> intro x <;> simp at x <;>
simp only [is_even_body, is_odd_body]
-- Prove the validity of the individual bodies
. split <;> simp
apply is_valid_p_bind <;> simp
. split <;> simp
apply is_valid_p_bind <;> simp
theorem body_fix_eq : fix body = body (fix body) :=
is_valid_fix_fixed_eq body_is_valid
def is_even (i : Int) : Result Bool := fix body 0 i
def is_odd (i : Int) : Result Bool := fix body 1 i
theorem is_even_eq (i : Int) : is_even i =
(if i = 0
then .ret true
else do
let b ← is_odd (i - 1)
.ret b) := by
simp [is_even, is_odd];
conv => lhs; rw [body_fix_eq]
theorem is_odd_eq (i : Int) : is_odd i =
(if i = 0
then .ret false
else do
let b ← is_even (i - 1)
.ret b) := by
simp [is_even, is_odd];
conv => lhs; rw [body_fix_eq]
end Ex4
namespace Ex5
/- Higher-order example -/
open Primitives Fix
variable {a b : Type}
/- An auxiliary function, which doesn't require the fixed-point -/
def map (f : a → Result b) (ls : List a) : Result (List b) :=
match ls with
| [] => .ret []
| hd :: tl =>
do
let hd ← f hd
let tl ← map f tl
.ret (hd :: tl)
/- The validity theorem for `map`, generic in `f` -/
theorem map_is_valid
{{f : (a → Result b) → a → Result c}}
(Hfvalid : ∀ k x, is_valid_p k (λ k => f k x))
(k : (a → Result b) → a → Result b)
(ls : List a) :
is_valid_p k (λ k => map (f k) ls) := by
induction ls <;> simp [map]
apply is_valid_p_bind <;> simp_all
intros
apply is_valid_p_bind <;> simp_all
/- An example which uses map -/
inductive Tree (a : Type) :=
| leaf (x : a)
| node (tl : List (Tree a))
def id_body (k : Tree a → Result (Tree a)) (t : Tree a) : Result (Tree a) :=
match t with
| .leaf x => .ret (.leaf x)
| .node tl =>
do
let tl ← map k tl
.ret (.node tl)
theorem id_body_is_valid :
∀ k x, is_valid_p k (λ k => @id_body a k x) := by
intro k x
simp only [id_body]
split <;> simp
apply is_valid_p_bind <;> simp [*]
-- We have to show that `map k tl` is valid
apply map_is_valid;
-- Remark: if we don't do the intro, then the last step is expensive:
-- "typeclass inference of Nonempty took 119ms"
intro k x
simp only [is_valid_p_same, is_valid_p_rec]
def id (t : Tree a) := fix id_body t
-- The unfolding equation
theorem id_eq (t : Tree a) :
(id t =
match t with
| .leaf x => .ret (.leaf x)
| .node tl =>
do
let tl ← map id tl
.ret (.node tl))
:= by
have Heq := is_valid_fix_fixed_eq (@id_body_is_valid a)
simp [id]
conv => lhs; rw [Heq]; simp; rw [id_body]
end Ex5
namespace Ex6
/- `list_nth` again, but this time we use FixI -/
open Primitives FixI
@[simp] def tys.{u} : List in_out_ty :=
[mk_in_out_ty ((a:Type u) × (List a × Int)) (λ ⟨ a, _ ⟩ => a)]
@[simp] def input_ty (i : Fin 1) := (tys.get i).fst
@[simp] def output_ty (i : Fin 1) (x : input_ty i) :=
(tys.get i).snd x
def list_nth_body.{u} (k : (i:Fin 1) → (x:input_ty i) → Result (output_ty i x))
(x : (a : Type u) × List a × Int) : Result x.fst :=
let ⟨ a, ls, i ⟩ := x
match ls with
| [] => .fail .panic
| hd :: tl =>
if i = 0 then .ret hd
else k 0 ⟨ a, tl, i - 1 ⟩
@[simp] def bodies :
Funs (Fin 1) input_ty output_ty tys :=
Funs.Cons list_nth_body Funs.Nil
def body (k : (i : Fin 1) → (x : input_ty i) → Result (output_ty i x)) (i: Fin 1) :
(x : input_ty i) → Result (output_ty i x) := get_fun bodies i k
theorem body_is_valid: is_valid body := by
-- Split the proof into proofs of validity of the individual bodies
rw [is_valid]
simp only [body]
intro k
apply (Funs.is_valid_p_is_valid_p tys)
simp [Funs.is_valid_p]
(repeat (apply And.intro)); intro x; simp at x
simp only [list_nth_body]
-- Prove the validity of the individual bodies
intro k x
simp [list_nth_body]
split <;> simp
split <;> simp
-- Writing the proof terms explicitly
theorem list_nth_body_is_valid' (k : k_ty (Fin 1) input_ty output_ty)
(x : (a : Type u) × List a × Int) : is_valid_p k (fun k => list_nth_body k x) :=
let ⟨ a, ls, i ⟩ := x
match ls with
| [] => is_valid_p_same k (.fail .panic)
| hd :: tl =>
is_valid_p_ite k (Eq i 0) (is_valid_p_same k (.ret hd)) (is_valid_p_rec k 0 ⟨a, tl, i-1⟩)
theorem body_is_valid' : is_valid body :=
fun k =>
Funs.is_valid_p_is_valid_p tys k bodies
(And.intro (list_nth_body_is_valid' k) (Funs.is_valid_p_Nil k))
def list_nth {a: Type u} (ls : List a) (i : Int) : Result a :=
fix body 0 ⟨ a, ls , i ⟩
-- The unfolding equation - diverges if `i < 0`
theorem list_nth_eq (ls : List a) (i : Int) :
list_nth ls i =
match ls with
| [] => .fail .panic
| hd :: tl =>
if i = 0 then .ret hd
else list_nth tl (i - 1)
:= by
have Heq := is_valid_fix_fixed_eq body_is_valid
simp [list_nth]
conv => lhs; rw [Heq]
-- Write the proof term explicitly: the generation of the proof term (without tactics)
-- is automatable, and the proof term is actually a lot simpler and smaller when we
-- don't use tactics.
theorem list_nth_eq'.{u} {a : Type u} (ls : List a) (i : Int) :
list_nth ls i =
match ls with
| [] => .fail .panic
| hd :: tl =>
if i = 0 then .ret hd
else list_nth tl (i - 1)
:=
-- Use the fixed-point equation
have Heq := is_valid_fix_fixed_eq body_is_valid.{u}
-- Add the index
have Heqi := congr_fun Heq 0
-- Add the input
have Heqix := congr_fun Heqi { fst := a, snd := (ls, i) }
-- Done
Heqix
end Ex6
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