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c9418149
Verified
Commit
c9418149
authored
Jun 14, 2019
by
Paolo G. Giarrusso
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tactic>tactic3 for userfacing tactics
parent
1f3e92e3
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theories/proofmode/ltac_tactics.v
theories/proofmode/ltac_tactics.v
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theories/proofmode/ltac_tactics.v
View file @
c9418149
...
...
@@ 1634,7 +1634,7 @@ Tactic Notation "iIntros" constr(p) "(" simple_intropattern(x1)
(* Used for generalization in iInduction and iLöb *)
Tactic
Notation
"iRevertIntros"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
Tactic
Notation
"iRevertIntros"
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
let
rec
go
Hs
:
=
lazymatch
Hs
with

[]
=>
tac
...
...
@@ 1643,56 +1643,56 @@ Tactic Notation "iRevertIntros" constr(Hs) "with" tactic(tac) :=
end
in
try
iStartProof
;
let
Hs
:
=
iElaborateSelPat
Hs
in
go
Hs
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
")"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
")"
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevert
(
x1
)
;
tac
;
iIntros
(
x1
)).
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
")"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevert
(
x1
x2
)
;
tac
;
iIntros
(
x1
x2
)).
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
")"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevert
(
x1
x2
x3
)
;
tac
;
iIntros
(
x1
x2
x3
)).
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
")"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevert
(
x1
x2
x3
x4
)
;
tac
;
iIntros
(
x1
x2
x3
x4
)).
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
ident
(
x5
)
")"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
ident
(
x5
)
")"
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevert
(
x1
x2
x3
x4
x5
)
;
tac
;
iIntros
(
x1
x2
x3
x4
x5
)).
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
ident
(
x5
)
ident
(
x6
)
")"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
ident
(
x5
)
ident
(
x6
)
")"
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevert
(
x1
x2
x3
x4
x5
x6
)
;
tac
;
iIntros
(
x1
x2
x3
x4
x5
x6
)).
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
ident
(
x5
)
ident
(
x6
)
ident
(
x7
)
")"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
ident
(
x5
)
ident
(
x6
)
ident
(
x7
)
")"
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevert
(
x1
x2
x3
x4
x5
x6
x7
)
;
tac
;
iIntros
(
x1
x2
x3
x4
x5
x6
x7
)).
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
ident
(
x5
)
ident
(
x6
)
ident
(
x7
)
ident
(
x8
)
")"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
ident
(
x5
)
ident
(
x6
)
ident
(
x7
)
ident
(
x8
)
")"
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevert
(
x1
x2
x3
x4
x5
x6
x7
x8
)
;
tac
;
iIntros
(
x1
x2
x3
x4
x5
x6
x7
x8
)).
Tactic
Notation
"iRevertIntros"
"with"
tactic
(
tac
)
:
=
Tactic
Notation
"iRevertIntros"
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
""
with
tac
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
")"
"with"
tactic
(
tac
)
:
=
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
")"
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
(
x1
)
""
with
tac
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
")"
"with"
tactic
(
tac
)
:
=
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
")"
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
(
x1
x2
)
""
with
tac
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
")"
"with"
tactic
(
tac
)
:
=
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
(
x1
x2
x3
)
""
with
tac
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
")"
"with"
tactic
(
tac
)
:
=
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
(
x1
x2
x3
x4
)
""
with
tac
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
ident
(
x5
)
")"
"with"
tactic
(
tac
)
:
=
ident
(
x5
)
")"
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
(
x1
x2
x3
x4
x5
)
""
with
tac
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
ident
(
x5
)
ident
(
x6
)
")"
"with"
tactic
(
tac
)
:
=
ident
(
x5
)
ident
(
x6
)
")"
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
(
x1
x2
x3
x4
x5
x6
)
""
with
tac
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
ident
(
x5
)
ident
(
x6
)
ident
(
x7
)
")"
"with"
tactic
(
tac
)
:
=
ident
(
x5
)
ident
(
x6
)
ident
(
x7
)
")"
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
(
x1
x2
x3
x4
x5
x6
x7
)
""
with
tac
.
Tactic
Notation
"iRevertIntros"
"("
ident
(
x1
)
ident
(
x2
)
ident
(
x3
)
ident
(
x4
)
ident
(
x5
)
ident
(
x6
)
ident
(
x7
)
ident
(
x8
)
")"
"with"
tactic
(
tac
)
:
=
ident
(
x5
)
ident
(
x6
)
ident
(
x7
)
ident
(
x8
)
")"
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
(
x1
x2
x3
x4
x5
x6
x7
x8
)
""
with
tac
.
(** * Destruct tactic *)
...
...
@@ 1901,7 +1901,7 @@ Ltac iHypsContaining x :=
let
Γ
s
:
=
lazymatch
goal
with

envs_entails
(
Envs
_
?
Γ
s
_
)
_
=>
Γ
s
end
in
let
Hs
:
=
go
Γ
p
x
(@
nil
ident
)
in
go
Γ
s
x
Hs
.
Tactic
Notation
"iInductionRevert"
constr
(
x
)
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
Tactic
Notation
"iInductionRevert"
constr
(
x
)
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevertIntros
"∗"
with
(
idtac
;
...
...
@@ 2083,7 +2083,7 @@ Tactic Notation "iLöbCore" "as" constr (IH) :=

_
=>
idtac
end
].
Tactic
Notation
"iLöbRevert"
constr
(
Hs
)
"with"
tactic
(
tac
)
:
=
Tactic
Notation
"iLöbRevert"
constr
(
Hs
)
"with"
tactic
3
(
tac
)
:
=
iRevertIntros
Hs
with
(
iRevertIntros
"∗"
with
tac
).
...
...
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