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Iris
Iris
Commits
a7b8df6f
Commit
a7b8df6f
authored
Feb 20, 2018
by
Joseph Tassarotti
Committed by
Robbert Krebbers
Feb 23, 2018
Browse files
More comments about iInv tactics.
parent
5a545315
Changes
3
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ProofMode.md
View file @
a7b8df6f
...
...
@@ 170,8 +170,11 @@ Rewriting / simplification
Iris


`iInv N as (x1 ... xn) "ipat" "Hclose"`
: open the invariant
`N`
, the update
for closing the invariant is put in a hypothesis named
`Hclose`
.

`iInv (N with "selpat") as (x1 ... xn) "ipat" "Hclose"`
: open the invariant
`N`
. The selection pattern
`selpat`
is used for any auxiliary assertions
needed to open the invariant (e.g. for cancelable or nonatomic
invariants). The update for closing the invariant is put in a hypothesis named
`Hclose`
.
Miscellaneous

...
...
theories/proofmode/classes.v
View file @
a7b8df6f
...
...
@@ 468,18 +468,19 @@ Proof. by apply as_valid. Qed.
Lemma
as_valid_2
(
φ
:
Prop
)
{
PROP
:
bi
}
(
P
:
PROP
)
`
{!
AsValid
φ
P
}
:
P
→
φ
.
Proof
.
by
apply
as_valid
.
Qed
.
(* Input:
`P`
; Outputs:
`N`
,
Extracts the namespace associated with an invariant assertion. Used for
`
iInv
`
. *)
(* Input:
[P]
; Outputs:
[N]
,
Extracts the namespace associated with an invariant assertion. Used for
[
iInv
]
. *)
Class
IntoInv
{
PROP
:
bi
}
(
P
:
PROP
)
(
N
:
namespace
).
Arguments
IntoInv
{
_
}
_
%
I
_
.
Hint
Mode
IntoInv
+
!

:
typeclass_instances
.
(* Input: `Pinv`;
 `Pinv`, an invariant assertion
 `Pin` the additional assertions needed for opening an invariant;
 `Pout` is the assertion obtained by opening the invariant;
 `Q` is a goal on which iInv may be invoked;
 `Q'` is the transformed goal that must be proved after opening the invariant.
(* Input: [Pinv]
Arguments:
 [Pinv] is an invariant assertion
 [Pin] is an additional assertion needed for opening an invariant
 [Pout] is the assertion obtained by opening the invariant
 [Q] is a goal on which iInv may be invoked
 [Q'] is the transformed goal that must be proved after opening the invariant.
There are similarities to the definition of ElimModal, however we
want to be general enough to support uses in settings where there
...
...
theories/proofmode/tactics.v
View file @
a7b8df6f
...
...
@@ 1865,6 +1865,11 @@ Tactic Notation "iMod" open_constr(lem) "as" "(" simple_intropattern(x1)
Tactic
Notation
"iMod"
open_constr
(
lem
)
"as"
"%"
simple_intropattern
(
pat
)
:
=
iDestructCore
lem
as
false
(
fun
H
=>
iModCore
H
;
iPure
H
as
pat
).
(** * Assert *)
(* Finds a hypothesis in the context that is an invariant with
namespace [N]. To do so, we check whether for each hypothesis
["H":P] we can find an instance of [IntoInv P N] *)
Tactic
Notation
"iAssumptionInv"
constr
(
N
)
:
=
let
rec
find
Γ
i
P
:
=
lazymatch
Γ
with
...
...
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