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3c1d84a9
Commit
3c1d84a9
authored
Feb 10, 2013
by
Adam Chlipala
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Pass through Chapter 14
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9d3f4210
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...
@@ -315,7 +315,7 @@ User error: No matching clauses for match goal
...
@@ -315,7 +315,7 @@ User error: No matching clauses for match goal
Abort
.
Abort
.
(
*
end
thide
*
)
(
*
end
thide
*
)
(
**
The
problem
is
that
unification
variables
may
not
contain
locally
bound
variables
.
In
this
case
,
[
?
P
]
would
need
to
be
bound
to
[
x
=
x
]
,
which
contains
the
local
quantified
variable
[
x
]
.
By
using
a
wildcard
in
the
earlier
version
,
we
avoided
this
restriction
.
To
understand
why
this
applies
to
the
[
completer
]
tactics
,
recall
that
,
in
Coq
,
implication
is
shorthand
for
degenerate
universal
quantification
where
the
quantified
variable
is
not
used
.
Nonetheless
,
in
an
Ltac
pattern
,
Coq
is
happy
to
match
a
wildcard
implication
against
a
universal
quantification
.
(
**
The
problem
is
that
unification
variables
may
not
contain
locally
bound
variables
.
In
this
case
,
[
?
P
]
would
need
to
be
bound
to
[
x
=
x
]
,
which
contains
the
local
quantified
variable
[
x
]
.
By
using
a
wildcard
in
the
earlier
version
,
we
avoided
this
restriction
.
To
understand
why
this
restriction
affects
the
behavior
of
the
[
completer
]
tactic
,
recall
that
,
in
Coq
,
implication
is
shorthand
for
degenerate
universal
quantification
where
the
quantified
variable
is
not
used
.
Nonetheless
,
in
an
Ltac
pattern
,
Coq
is
happy
to
match
a
wildcard
implication
against
a
universal
quantification
.
The
Coq
8.2
release
includes
a
special
pattern
form
for
a
unification
variable
with
an
explicit
set
of
free
variables
.
That
unification
variable
is
then
bound
to
a
function
from
the
free
variables
to
the
"real"
value
.
In
Coq
8.1
and
earlier
,
there
is
no
such
workaround
.
We
will
see
an
example
of
this
fancier
binding
form
in
Section
15.5
.
The
Coq
8.2
release
includes
a
special
pattern
form
for
a
unification
variable
with
an
explicit
set
of
free
variables
.
That
unification
variable
is
then
bound
to
a
function
from
the
free
variables
to
the
"real"
value
.
In
Coq
8.1
and
earlier
,
there
is
no
such
workaround
.
We
will
see
an
example
of
this
fancier
binding
form
in
Section
15.5
.
...
@@ -532,7 +532,7 @@ Ltac inster n :=
...
@@ -532,7 +532,7 @@ Ltac inster n :=
end
.
end
.
(
*
end
thide
*
)
(
*
end
thide
*
)
(
**
The
tactic
begins
by
applying
propositional
simplification
.
Next
,
it
checks
if
any
chain
length
remains
,
failing
if
not
.
If
so
,
it
tries
all
possible
ways
of
instantiating
quantified
hypotheses
with
properly
typed
local
variables
.
It
is
critical
to
realize
that
,
if
the
recursive
call
[
inster
n
'
]
fails
,
then
the
[
match
goal
]
just
seeks
out
another
way
of
unifying
its
pattern
against
proof
state
.
Thus
,
this
small
amount
of
code
provides
an
elegant
demonstration
of
how
backtracking
[
match
]
enables
exhaustive
search
.
(
**
The
tactic
begins
by
applying
propositional
simplification
.
Next
,
it
checks
if
any
chain
length
remains
,
failing
if
not
.
Otherwise
,
it
tries
all
possible
ways
of
instantiating
quantified
hypotheses
with
properly
typed
local
variables
.
It
is
critical
to
realize
that
,
if
the
recursive
call
[
inster
n
'
]
fails
,
then
the
[
match
goal
]
just
seeks
out
another
way
of
unifying
its
pattern
against
proof
state
.
Thus
,
this
small
amount
of
code
provides
an
elegant
demonstration
of
how
backtracking
[
match
]
enables
exhaustive
search
.
We
can
verify
the
efficacy
of
[
inster
]
with
two
short
examples
.
The
built
-
in
[
firstorder
]
tactic
(
with
no
extra
arguments
)
is
able
to
prove
the
first
but
not
the
second
.
*
)
We
can
verify
the
efficacy
of
[
inster
]
with
two
short
examples
.
The
built
-
in
[
firstorder
]
tactic
(
with
no
extra
arguments
)
is
able
to
prove
the
first
but
not
the
second
.
*
)
...
@@ -637,7 +637,7 @@ Ltac search_prem tac :=
...
@@ -637,7 +637,7 @@ Ltac search_prem tac :=
(
**
To
understand
how
[
search_prem
]
works
,
we
turn
first
to
the
final
[
match
]
.
If
the
premise
begins
with
a
conjunction
,
we
call
the
[
search
]
procedure
on
each
of
the
conjuncts
,
or
only
the
first
conjunct
,
if
that
already
yields
a
case
where
[
tac
]
does
not
fail
.
The
call
[
search
P
]
expects
and
maintains
the
invariant
that
the
premise
is
of
the
form
[
P
/
\
Q
]
for
some
[
Q
]
.
We
pass
[
P
]
explicitly
as
a
kind
of
decreasing
induction
measure
,
to
avoid
looping
forever
when
[
tac
]
always
fails
.
The
second
[
match
]
case
calls
a
commutativity
lemma
to
realize
this
invariant
,
before
passing
control
to
[
search
]
.
The
final
[
match
]
case
tries
applying
[
tac
]
directly
and
then
,
if
that
fails
,
changes
the
form
of
the
goal
by
adding
an
extraneous
[
True
]
conjunct
and
calls
[
tac
]
again
.
The
%
\
index
{
tactics
!
progress
}%
[
progress
]
tactical
fails
when
its
argument
tactic
succeeds
without
changing
the
current
subgoal
.
(
**
To
understand
how
[
search_prem
]
works
,
we
turn
first
to
the
final
[
match
]
.
If
the
premise
begins
with
a
conjunction
,
we
call
the
[
search
]
procedure
on
each
of
the
conjuncts
,
or
only
the
first
conjunct
,
if
that
already
yields
a
case
where
[
tac
]
does
not
fail
.
The
call
[
search
P
]
expects
and
maintains
the
invariant
that
the
premise
is
of
the
form
[
P
/
\
Q
]
for
some
[
Q
]
.
We
pass
[
P
]
explicitly
as
a
kind
of
decreasing
induction
measure
,
to
avoid
looping
forever
when
[
tac
]
always
fails
.
The
second
[
match
]
case
calls
a
commutativity
lemma
to
realize
this
invariant
,
before
passing
control
to
[
search
]
.
The
final
[
match
]
case
tries
applying
[
tac
]
directly
and
then
,
if
that
fails
,
changes
the
form
of
the
goal
by
adding
an
extraneous
[
True
]
conjunct
and
calls
[
tac
]
again
.
The
%
\
index
{
tactics
!
progress
}%
[
progress
]
tactical
fails
when
its
argument
tactic
succeeds
without
changing
the
current
subgoal
.
The
[
search
]
function
itself
tries
the
same
tricks
as
in
the
last
case
of
the
final
[
match
]
,
using
the
[
||
]
operator
as
a
shorthand
for
trying
one
tactic
and
then
,
if
the
first
fails
,
trying
another
.
Additionally
,
if
neither
works
,
it
checks
if
[
P
]
is
a
conjunction
.
If
so
,
it
calls
itself
recursively
on
each
conjunct
,
first
applying
associativity
lemmas
to
maintain
the
goal
-
form
invariant
.
The
[
search
]
function
itself
tries
the
same
tricks
as
in
the
last
case
of
the
final
[
match
]
,
using
the
[
||
]
operator
as
a
shorthand
for
trying
one
tactic
and
then
,
if
the
first
fails
,
trying
another
.
Additionally
,
if
neither
works
,
it
checks
if
[
P
]
is
a
conjunction
.
If
so
,
it
calls
itself
recursively
on
each
conjunct
,
first
applying
associativity
/
commutativity
lemmas
to
maintain
the
goal
-
form
invariant
.
We
will
also
want
a
dual
function
[
search_conc
]
,
which
does
tree
search
through
an
[
imp
]
conclusion
.
*
)
We
will
also
want
a
dual
function
[
search_conc
]
,
which
does
tree
search
through
an
[
imp
]
conclusion
.
*
)
...
...
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