module 1Lab.Inductive where
open import 1Lab.Reflection
open import 1Lab.Equiv
open import 1Lab.Type hiding (case_of_ ; case_return_of_)
{-
Automation for applying induction principles
============================================
When working with mixed truncations/products/quotients, the relevant
induction principles are often repeatedly applied in close succession,
like in the snippet below.
□-rec! λ { (a , b , w) → □-rec! (λ { (c , d , x) →
inc (c , d , inc (a , x , w)) }) b }
Applying these induction principles is entirely mechanical: like other
mechanical processes, it's annoying to do by hand, generates ugly code,
and causes a deep sense of existential uselessness. This module
implements automation for automatically applying these eliminators "as
far as possible", using overlapping instances.
The Inductive class
-------------------
The core of the implementation for rec!/elim! is the Inductive class,
which is a slight misnomer. To support *nested* types with a single
constructor, the Inductive class is applied to a section of the motive,
not just base type. That is, if we want to simplify
□ (□ A × □ (□ A)) → B
^~~~~~~~~~~~~~~~~ domain
we don't look for an instance of `Inductive domain`, we look for an
instance of `Inductive (domain → B)`. The relevant instances then
manipulate the entire function type at once, much like Extensional.
Writing rules
-------------
Like Extensional, instances of 'Inductive' should be maximally lazy, so
that the structural rules can fire as often as possible. That is,
instead of writing
⦃ _ : ∀ {x} → Inductive (P (inc x)) ⦄ → Inductive (∀ x → P x)
we write
⦃ _ : Inductive (∀ x → P (inc x)) ⦄ → Inductive (∀ x → P x)
-}
record Inductive {ℓ} (A : Type ℓ) ℓm : Type (ℓ ⊔ lsuc ℓm) where
field
methods : Type ℓm
from : methods → A
open Inductive
private variable
ℓ ℓ' ℓ'' ℓm : Level
A B C : Type ℓ
P Q R : A → Type ℓ
instance
-- The basic structural rules allow us to stop recurring (we can
-- produce an A given an A) and to skip an argument, introducing a
-- function type into the methods:
Inductive-default : Inductive A (level-of A)
Inductive-default .methods = _
Inductive-default .from x = x
Inductive-Π
: ⦃ _ : {x : A} → Inductive (P x) ℓm ⦄
→ Inductive (∀ x → P x) (level-of A ⊔ ℓm)
Inductive-Π ⦃ r ⦄ .methods = ∀ x → r {x} .methods
Inductive-Π ⦃ r ⦄ .from f x = r .from (f x)
{-# INCOHERENT Inductive-default #-}
{-# OVERLAPPABLE Inductive-Π #-}
-- Next, we have a rule for uncurrying pairs. This lets us handle types like
-- □ (□ A × □ B) → C
--
-- by factoring through
--
-- □ (□ A × □ B) → C
-- □ A × □ B → C
-- □ A → □ B → C
-- □ B → C
Inductive-Σ
: ∀ {A : Type ℓ} {B : A → Type ℓ'} {C : (x : A) → B x → Type ℓ''}
→ ⦃ _ : Inductive ((x : A) (y : B x) → C x y) ℓm ⦄
→ Inductive ((x : Σ A B) → C (x .fst) (x .snd)) ℓm
Inductive-Σ ⦃ r ⦄ .methods = r .methods
Inductive-Σ ⦃ r ⦄ .from f (x , y) = r .from f x y
Inductive-Lift
: {B : Lift ℓ A → Type ℓ'}
→ ⦃ _ : Inductive (∀ x → B (lift x)) ℓm ⦄
→ Inductive (∀ x → B x) ℓm
Inductive-Lift ⦃ i ⦄ = record { from = λ f (lift x) → i .from f x }
-- However, we don't uncurry equivalences.
Inductive-≃ : {C : A ≃ B → Type ℓ''} → Inductive (∀ x → C x) _
Inductive-≃ = Inductive-default
{-# OVERLAPPING Inductive-≃ #-}
-- There are two distinct prefix entry points: rec! and elim!. The
-- difference is just in name, to provide a modicum of documentation. In
-- addition, they have an explicit function type, so that the refine
-- command will always introduce a question mark.
rec! : ⦃ r : Inductive (A → B) ℓm ⦄ → r .methods → A → B
rec! ⦃ r ⦄ = r .from
elim! : ⦃ r : Inductive (∀ x → P x) ℓm ⦄ → r .methods → ∀ x → P x
elim! ⦃ r ⦄ = r .from
-- We also define versions of case_of_ and case_return_of_, shadowing
-- those from 1Lab.Type, which insert a rec!/elim!.
case_of_ : ∀ {ℓ ℓ'} {A : Type ℓ} {B : Type ℓ'} ⦃ r : Inductive (A → B) ℓm ⦄ → A → r .methods → B
case x of f = rec! f x
case_return_of_ : ∀ {ℓ ℓ'} {A : Type ℓ} (x : A) (B : A → Type ℓ') ⦃ r : Inductive (∀ x → B x) ℓm ⦄ (f : r .methods) → B x
case x return P of f = elim! f x
{-# INLINE case_of_ #-}
{-# INLINE case_return_of_ #-}