------------------------------------------------------------------------
-- The Agda standard library
--
-- The Maybe type and some operations
------------------------------------------------------------------------

-- The definitions in this file are reexported by Data.Maybe.

module Data.Maybe.Base where

open import Level

data Maybe {a} (A : Set a) : Set a where
  just    : (x : A)  Maybe A
  nothing : Maybe A

{-# IMPORT Data.FFI #-}
{-# COMPILED_DATA Maybe Data.FFI.AgdaMaybe Just Nothing #-}

------------------------------------------------------------------------
-- Some operations

open import Data.Bool.Base using (Bool; true; false; not)
open import Data.Unit.Base using ()
open import Function
open import Relation.Nullary

boolToMaybe : Bool  Maybe 
boolToMaybe true  = just _
boolToMaybe false = nothing

is-just :  {a} {A : Set a}  Maybe A  Bool
is-just (just _) = true
is-just nothing  = false

is-nothing :  {a} {A : Set a}  Maybe A  Bool
is-nothing = not  is-just

decToMaybe :  {a} {A : Set a}  Dec A  Maybe A
decToMaybe (yes x) = just x
decToMaybe (no _)  = nothing

-- A dependent eliminator.

maybe :  {a b} {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

-- A non-dependent eliminator.

maybe′ :  {a b} {A : Set a} {B : Set b}  (A  B)  B  Maybe A  B
maybe′ = maybe

-- A safe variant of "fromJust". If the value is nothing, then the
-- return type is the unit type.

From-just :  {a} (A : Set a)  Maybe A  Set a
From-just A (just _) = A
From-just A nothing  = Lift 

from-just :  {a} {A : Set a} (x : Maybe A)  From-just A x
from-just (just x) = x
from-just nothing  = _

-- Functoriality: map.

map :  {a b} {A : Set a} {B : Set b}  (A  B)  Maybe A  Maybe B
map f = maybe (just  f) nothing

------------------------------------------------------------------------
-- Any and All

open Data.Bool.Base using (T)
open import Data.Empty using ()

data Any {a p} {A : Set a} (P : A  Set p) : Maybe A  Set (a  p) where
  just :  {x} (px : P x)  Any P (just x)

data All {a p} {A : Set a} (P : A  Set p) : Maybe A  Set (a  p) where
  just    :  {x} (px : P x)  All P (just x)
  nothing : All P nothing

Is-just :  {a} {A : Set a}  Maybe A  Set a
Is-just = Any  _  )

Is-nothing :  {a} {A : Set a}  Maybe A  Set a
Is-nothing = All  _  )

to-witness :  {p} {P : Set p} {m : Maybe P}  Is-just m  P
to-witness (just {x = p} _) = p

to-witness-T :  {p} {P : Set p} (m : Maybe P)  T (is-just m)  P
to-witness-T (just p) _  = p
to-witness-T nothing  ()