{-# OPTIONS --without-K --safe #-}
module Data.Maybe.Base where
open import Level
open import Data.Bool.Base using (Bool; true; false; not)
open import Data.Unit.Base using (⊤)
open import Data.These.Base using (These; this; that; these)
open import Data.Product as Prod using (_×_; _,_)
open import Function
open import Relation.Nullary
private
variable
a b c : Level
A : Set a
B : Set b
C : Set c
data Maybe (A : Set a) : Set a where
just : (x : A) → Maybe A
nothing : Maybe A
boolToMaybe : Bool → Maybe ⊤
boolToMaybe true = just _
boolToMaybe false = nothing
is-just : Maybe A → Bool
is-just (just _) = true
is-just nothing = false
is-nothing : Maybe A → Bool
is-nothing = not ∘ is-just
decToMaybe : Dec A → Maybe A
decToMaybe (yes x) = just x
decToMaybe (no _) = nothing
maybe : ∀ {A : Set a} {B : Maybe A → Set b} →
((x : A) → B (just x)) → B nothing → (x : Maybe A) → B x
maybe j n (just x) = j x
maybe j n nothing = n
maybe′ : (A → B) → B → Maybe A → B
maybe′ = maybe
fromMaybe : A → Maybe A → A
fromMaybe = maybe′ id
module _ {a} {A : Set a} where
From-just : Maybe A → Set a
From-just (just _) = A
From-just nothing = Lift a ⊤
from-just : (x : Maybe A) → From-just x
from-just (just x) = x
from-just nothing = _
map : (A → B) → Maybe A → Maybe B
map f = maybe (just ∘ f) nothing
ap : Maybe (A → B) → Maybe A → Maybe B
ap nothing = const nothing
ap (just f) = map f
infixl 1 _>>=_
_>>=_ : Maybe A → (A → Maybe B) → Maybe B
nothing >>= f = nothing
just a >>= f = f a
_<∣>_ : Maybe A → Maybe A → Maybe A
just x <∣> my = just x
nothing <∣> my = my
alignWith : (These A B → C) → Maybe A → Maybe B → Maybe C
alignWith f (just a) (just b) = just (f (these a b))
alignWith f (just a) nothing = just (f (this a))
alignWith f nothing (just b) = just (f (that b))
alignWith f nothing nothing = nothing
zipWith : (A → B → C) → Maybe A → Maybe B → Maybe C
zipWith f (just a) (just b) = just (f a b)
zipWith _ _ _ = nothing
align : Maybe A → Maybe B → Maybe (These A B)
align = alignWith id
zip : Maybe A → Maybe B → Maybe (A × B)
zip = zipWith _,_
thisM : A → Maybe B → These A B
thisM a = maybe′ (these a) (this a)
thatM : Maybe A → B → These A B
thatM = maybe′ these that