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lean4-htt/tests/lean/infoTree.lean.expected.out
Leonardo de Moura 5e66f4c97c feat: dot completion experiment 
We still need to use the expected type, fix error recovery, etc. But it
is showing signs of life for very basic examples.

It is disabled for now.
2021-04-01 23:31:38 -07:00

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[Elab.info] command @ ⟨13, 0⟩-⟨15, 6⟩
Nat : Type @ ⟨13, 11⟩-⟨13, 14⟩
Nat : Type @ ⟨13, 11⟩-⟨13, 14⟩
x : Nat @ ⟨13, 7⟩-⟨13, 8⟩
Nat × Nat : Type @ ⟨13, 18⟩-⟨13, 27⟩
Macro expansion
Nat × Nat
===>
Prod✝ Nat Nat
Prod : Type → Type → Type @ ⟨13, 18⟩†-⟨13, 22⟩†
Nat : Type @ ⟨13, 18⟩-⟨13, 21⟩
Nat : Type @ ⟨13, 18⟩-⟨13, 21⟩
Nat : Type @ ⟨13, 24⟩-⟨13, 27⟩
Nat : Type @ ⟨13, 24⟩-⟨13, 27⟩
let y : Nat × Nat := (x, x);
id y : Nat × Nat @ ⟨14, 2⟩-⟨15, 6⟩
Nat × Nat : Type @ ⟨14, 6⟩-⟨14, 7⟩
(x, x) : Nat × Nat @ ⟨14, 11⟩-⟨14, 17⟩
Macro expansion
⟨x, x⟩
===>
Prod.mk✝ x x
(x, x) : Nat × Nat @ ⟨14, 11⟩†-⟨14, 16⟩
Prod.mk : {α β : Type} → α → β → α × β @ ⟨14, 11⟩†-⟨17, 8⟩†
x : Nat @ ⟨14, 12⟩-⟨14, 13⟩
x : Nat @ ⟨14, 12⟩-⟨14, 13⟩
x : Nat @ ⟨14, 15⟩-⟨14, 16⟩
x : Nat @ ⟨14, 15⟩-⟨14, 16⟩
y : Nat × Nat @ ⟨14, 6⟩-⟨14, 7⟩
id y : Nat × Nat @ ⟨15, 2⟩-⟨15, 6⟩
id : {α : Type} → αα @ ⟨15, 2⟩-⟨15, 4⟩
y : Nat × Nat @ ⟨15, 5⟩-⟨15, 6⟩
y : Nat × Nat @ ⟨15, 5⟩-⟨15, 6⟩
[Elab.info] command @ ⟨17, 0⟩-⟨19, 8⟩
∀ (x y : Nat), Bool → x + 0 = x : Prop @ ⟨17, 8⟩-⟨17, 44⟩
Nat : Type @ ⟨17, 15⟩-⟨17, 18⟩
Nat : Type @ ⟨17, 15⟩-⟨17, 18⟩
x : Nat @ ⟨17, 9⟩-⟨17, 10⟩
Nat : Type @ ⟨17, 15⟩-⟨17, 18⟩
Nat : Type @ ⟨17, 15⟩-⟨17, 18⟩
y : Nat @ ⟨17, 11⟩-⟨17, 12⟩
Bool → x + 0 = x : Prop @ ⟨17, 22⟩-⟨17, 44⟩
Bool : Type @ ⟨17, 27⟩-⟨17, 31⟩
Bool : Type @ ⟨17, 27⟩-⟨17, 31⟩
b : Bool @ ⟨17, 23⟩-⟨17, 24⟩
x + 0 = x : Prop @ ⟨17, 35⟩-⟨17, 44⟩
Macro expansion
x + 0 = x
===>
binrel% Eq✝ (x + 0)x
x + 0 : Nat @ ⟨17, 35⟩-⟨17, 40⟩
Macro expansion
x + 0
===>
HAdd.hAdd✝ x 0
HAdd.hAdd : {α β γ : Type} → [self : HAdd α β γ] → α → β → γ @ ⟨17, 35⟩†-⟨17, 44⟩†
x : Nat @ ⟨17, 35⟩-⟨17, 36⟩
x : Nat @ ⟨17, 35⟩-⟨17, 36⟩
0 : Nat @ ⟨17, 39⟩-⟨17, 40⟩
x : Nat @ ⟨17, 43⟩-⟨17, 44⟩
x : Nat @ ⟨17, 43⟩-⟨17, 44⟩
fun (x y : Nat) (b : Bool) =>
ofEqTrue
(Eq.trans (congrFun (congrArg Eq (Nat.add_zero x)) x)
(eqSelf x)) : ∀ (x y : Nat), Bool → x + 0 = x @ ⟨18, 2⟩-⟨19, 8⟩
Nat : Type @ ⟨18, 6⟩-⟨18, 7⟩
x : Nat @ ⟨18, 6⟩-⟨18, 7⟩
Nat : Type @ ⟨18, 8⟩-⟨18, 9⟩
y : Nat @ ⟨18, 8⟩-⟨18, 9⟩
Bool : Type @ ⟨18, 10⟩-⟨18, 11⟩
b : Bool @ ⟨18, 10⟩-⟨18, 11⟩
Tactic @ ⟨19, 4⟩-⟨19, 8⟩
before
x y : Nat
b : Bool
⊢ x + 0 = x
after no goals
Tactic @ ⟨19, 4⟩-⟨19, 8⟩
before
x y : Nat
b : Bool
⊢ x + 0 = x
after no goals
Tactic @ ⟨19, 4⟩-⟨19, 8⟩
before
x y : Nat
b : Bool
⊢ x + 0 = x
after no goals
[Elab.info] command @ ⟨21, 0⟩-⟨25, 10⟩
Nat → Nat → Bool → Nat : Type @ ⟨21, 9⟩-⟨21, 39⟩
Nat : Type @ ⟨21, 16⟩-⟨21, 19⟩
Nat : Type @ ⟨21, 16⟩-⟨21, 19⟩
x : Nat @ ⟨21, 10⟩-⟨21, 11⟩
Nat : Type @ ⟨21, 16⟩-⟨21, 19⟩
Nat : Type @ ⟨21, 16⟩-⟨21, 19⟩
y : Nat @ ⟨21, 12⟩-⟨21, 13⟩
Bool → Nat : Type @ ⟨21, 23⟩-⟨21, 39⟩
Bool : Type @ ⟨21, 28⟩-⟨21, 32⟩
Bool : Type @ ⟨21, 28⟩-⟨21, 32⟩
b : Bool @ ⟨21, 24⟩-⟨21, 25⟩
Nat : Type @ ⟨21, 36⟩-⟨21, 39⟩
Nat : Type @ ⟨21, 36⟩-⟨21, 39⟩
fun (x y : Nat) (b : Bool) =>
let x : Nat × Nat := (x + y, x - y);
match x with
| (z, w) =>
let z1 : Nat := z + w;
z + z1 : Nat → Nat → Bool → Nat @ ⟨22, 2⟩-⟨25, 10⟩
Nat : Type @ ⟨22, 6⟩-⟨22, 7⟩
x : Nat @ ⟨22, 6⟩-⟨22, 7⟩
Nat : Type @ ⟨22, 8⟩-⟨22, 9⟩
y : Nat @ ⟨22, 8⟩-⟨22, 9⟩
Bool : Type @ ⟨22, 10⟩-⟨22, 11⟩
b : Bool @ ⟨22, 10⟩-⟨22, 11⟩
let x : Nat × Nat := (x + y, x - y);
match x with
| (z, w) =>
let z1 : Nat := z + w;
z + z1 : Nat @ ⟨23, 4⟩-⟨25, 10⟩
Macro expansion
let (z, w) := (x + y, x - y)
let z1 := z + w
z + z1
===>
let x✝ : _ := (x + y, x - y);
match x✝ with
| (z, w) =>
let z1 := z + w
z + z1
let x : Nat × Nat := (x + y, x - y);
match x with
| (z, w) =>
let z1 : Nat := z + w;
z + z1 : Nat @ ⟨23, 4⟩†-⟨25, 10⟩
Nat × Nat : Type @ ⟨23, 4⟩-⟨23, 5⟩
(x + y, x - y) : Nat × Nat @ ⟨23, 18⟩-⟨23, 32⟩
Macro expansion
(x + y, x - y)
===>
Prod.mk✝ (x + y) (x - y)
(x + y, x - y) : Nat × Nat @ ⟨23, 18⟩†-⟨23, 31⟩
Prod.mk : {α β : Type} → α → β → α × β @ ⟨23, 18⟩†-⟨23, 25⟩†
x + y : Nat @ ⟨23, 19⟩-⟨23, 24⟩
Macro expansion
x + y
===>
HAdd.hAdd✝ x y
HAdd.hAdd : {α β γ : Type} → [self : HAdd α β γ] → α → β → γ @ ⟨23, 19⟩†-⟨23, 28⟩†
x : Nat @ ⟨23, 19⟩-⟨23, 20⟩
x : Nat @ ⟨23, 19⟩-⟨23, 20⟩
y : Nat @ ⟨23, 23⟩-⟨23, 24⟩
y : Nat @ ⟨23, 23⟩-⟨23, 24⟩
x - y : Nat @ ⟨23, 26⟩-⟨23, 31⟩
Macro expansion
x - y
===>
HSub.hSub✝ x y
HSub.hSub : {α β γ : Type} → [self : HSub α β γ] → α → β → γ @ ⟨23, 26⟩†-⟨24, 2⟩†
x : Nat @ ⟨23, 26⟩-⟨23, 27⟩
x : Nat @ ⟨23, 26⟩-⟨23, 27⟩
y : Nat @ ⟨23, 30⟩-⟨23, 31⟩
y : Nat @ ⟨23, 30⟩-⟨23, 31⟩
x✝ : Nat × Nat @ ⟨23, 4⟩†-⟨25, 10⟩†
match x✝ with
| (z, w) =>
let z1 : Nat := z + w;
z + z1 : Nat @ ⟨23, 4⟩†-⟨25, 10⟩
(z, w) : Nat × Nat @ ⟨23, 8⟩-⟨23, 14⟩
Macro expansion
(z, w)
===>
Prod.mk✝ z w
(z, w) : Nat × Nat @ ⟨23, 8⟩†-⟨23, 13⟩
Prod.mk : {α β : Type} → α → β → α × β @ ⟨23, 8⟩†-⟨23, 15⟩†
z : Nat @ ⟨23, 9⟩-⟨23, 10⟩
z : Nat @ ⟨23, 9⟩-⟨23, 10⟩
w : Nat @ ⟨23, 12⟩-⟨23, 13⟩
w : Nat @ ⟨23, 12⟩-⟨23, 13⟩
let z1 : Nat := z + w;
z + z1 : Nat @ ⟨24, 4⟩-⟨25, 10⟩
Nat : Type @ ⟨24, 8⟩-⟨24, 9⟩
z + w : Nat @ ⟨24, 14⟩-⟨24, 19⟩
Macro expansion
z + w
===>
HAdd.hAdd✝ z w
HAdd.hAdd : {α β γ : Type} → [self : HAdd α β γ] → α → β → γ @ ⟨24, 14⟩†-⟨25, 3⟩†
z : Nat @ ⟨24, 14⟩-⟨24, 15⟩
z : Nat @ ⟨24, 14⟩-⟨24, 15⟩
w : Nat @ ⟨24, 18⟩-⟨24, 19⟩
w : Nat @ ⟨24, 18⟩-⟨24, 19⟩
z1 : Nat @ ⟨24, 8⟩-⟨24, 10⟩
z + z1 : Nat @ ⟨25, 4⟩-⟨25, 10⟩
Macro expansion
z + z1
===>
HAdd.hAdd✝ z z1
HAdd.hAdd : {α β γ : Type} → [self : HAdd α β γ] → α → β → γ @ ⟨25, 4⟩†-⟨27, 1⟩†
z : Nat @ ⟨25, 4⟩-⟨25, 5⟩
z : Nat @ ⟨25, 4⟩-⟨25, 5⟩
z1 : Nat @ ⟨25, 8⟩-⟨25, 10⟩
z1 : Nat @ ⟨25, 8⟩-⟨25, 10⟩
[Elab.info] command @ ⟨27, 0⟩-⟨28, 17⟩
Nat × Array (Array Nat) : Type @ ⟨27, 12⟩-⟨27, 35⟩
Macro expansion
Nat × Array (Array Nat)
===>
Prod✝ Nat (Array (Array Nat))
Prod : Type → Type → Type @ ⟨27, 12⟩†-⟨27, 16⟩†
Nat : Type @ ⟨27, 12⟩-⟨27, 15⟩
Nat : Type @ ⟨27, 12⟩-⟨27, 15⟩
Array (Array Nat) : Type @ ⟨27, 18⟩-⟨27, 35⟩
Array : Type → Type @ ⟨27, 18⟩-⟨27, 23⟩
Array Nat : Type @ ⟨27, 24⟩-⟨27, 35⟩
Array Nat : Type @ ⟨27, 25⟩-⟨27, 34⟩
Array : Type → Type @ ⟨27, 25⟩-⟨27, 30⟩
Nat : Type @ ⟨27, 31⟩-⟨27, 34⟩
Nat : Type @ ⟨27, 31⟩-⟨27, 34⟩
s : Nat × Array (Array Nat) @ ⟨27, 8⟩-⟨27, 9⟩
Array Nat : Type @ ⟨27, 39⟩-⟨27, 48⟩
Array : Type → Type @ ⟨27, 39⟩-⟨27, 44⟩
Nat : Type @ ⟨27, 45⟩-⟨27, 48⟩
Nat : Type @ ⟨27, 45⟩-⟨27, 48⟩
Array.push (Array.getOp s.snd 1) s.fst : Array Nat @ ⟨28, 2⟩-⟨28, 17⟩
s : Nat × Array (Array Nat) @ ⟨28, 2⟩-⟨28, 3⟩
Prod.snd : {α β : Type} → α × β → β @ ⟨28, 4⟩-⟨28, 5⟩
Array.getOp : {α : Type} → [inst : Inhabited α] → Array α → Nat → α @ ⟨28, 5⟩-⟨28, 6⟩
1 : Nat @ ⟨28, 6⟩-⟨28, 7⟩
[.] Array.getOp s.snd 1 : Array Nat @ ⟨28, 2⟩-⟨28, 13⟩
Array.push : {α : Type} → Array αα → Array α @ ⟨28, 9⟩-⟨28, 13⟩
s.fst : Nat @ ⟨28, 14⟩-⟨28, 17⟩
s : Nat × Array (Array Nat) @ ⟨28, 14⟩-⟨28, 15⟩
Prod.fst : {α β : Type} → α × β → α @ ⟨28, 16⟩-⟨28, 17⟩
[Elab.info] command @ ⟨30, 0⟩-⟨31, 20⟩
B : Type @ ⟨30, 14⟩-⟨30, 15⟩
B : Type @ ⟨30, 14⟩-⟨30, 15⟩
arg : B @ ⟨30, 8⟩-⟨30, 11⟩
Nat : Type @ ⟨30, 19⟩-⟨30, 22⟩
Nat : Type @ ⟨30, 19⟩-⟨30, 22⟩
A.val arg.pair.fst 0 : Nat @ ⟨31, 2⟩-⟨31, 20⟩
arg : B @ ⟨31, 2⟩-⟨31, 5⟩
[.] arg : B @ ⟨31, 2⟩-⟨31, 18⟩
B.pair : B → A × A @ ⟨31, 6⟩-⟨31, 10⟩
[.] arg.pair : A × A @ ⟨31, 2⟩-⟨31, 18⟩
Prod.fst : {α β : Type} → α × β → α @ ⟨31, 11⟩-⟨31, 14⟩
[.] arg.pair.fst : A @ ⟨31, 2⟩-⟨31, 18⟩
A.val : A → Nat → Nat @ ⟨31, 15⟩-⟨31, 18⟩
0 : Nat @ ⟨31, 19⟩-⟨31, 20⟩
[Elab.info] command @ ⟨33, 0⟩-⟨35, 1⟩
Nat : Type @ ⟨33, 12⟩-⟨33, 15⟩
Nat : Type @ ⟨33, 12⟩-⟨33, 15⟩
x : Nat @ ⟨33, 8⟩-⟨33, 9⟩
B : Type @ ⟨33, 19⟩-⟨33, 20⟩
B : Type @ ⟨33, 19⟩-⟨33, 20⟩
{ pair := ({ val := id }, { val := id }) } : B @ ⟨33, 24⟩-⟨35, 1⟩
({ val := id }, { val := id }) : A × A @ ⟨34, 10⟩-⟨34, 40⟩
Macro expansion
({ val := id }, { val := id })
===>
Prod.mk✝ { val := id } { val := id }
({ val := id }, { val := id }) : A × A @ ⟨34, 10⟩†-⟨34, 39⟩
Prod.mk : {α β : Type} → α → β → α × β @ ⟨34, 10⟩†-⟨34, 17⟩†
{ val := id } : A @ ⟨34, 11⟩-⟨34, 24⟩
id : Nat → Nat @ ⟨34, 20⟩-⟨34, 22⟩
id : {α : Type} → αα @ ⟨34, 20⟩-⟨34, 22⟩
val : Nat → Nat := id @ ⟨34, 13⟩-⟨34, 16⟩
{ val := id } : A @ ⟨34, 26⟩-⟨34, 39⟩
id : Nat → Nat @ ⟨34, 35⟩-⟨34, 37⟩
id : {α : Type} → αα @ ⟨34, 35⟩-⟨34, 37⟩
val : Nat → Nat := id @ ⟨34, 28⟩-⟨34, 31⟩
pair : A × A := ({ val := id }, { val := id }) @ ⟨34, 2⟩-⟨34, 6⟩
def id.{u} : {α : Sort u} → αα :=
fun {α : Sort u} (a : α) => a
[Elab.info] command @ ⟨37, 0⟩-⟨37, 9⟩
id : {α : Sort u} → αα @ ⟨37, 7⟩-⟨37, 9⟩
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