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research
cpdt
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c18ac1c4
Commit
c18ac1c4
authored
Sep 10, 2008
by
Adam Chlipala
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Little fixes
parent
0f3a52f9
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InductiveTypes.v
src/InductiveTypes.v
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src/InductiveTypes.v
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c18ac1c4
...
...
@@ -87,7 +87,7 @@ Theorem the_sky_is_falling : forall x : Empty_set, 2 + 2 = 5.
destruct
1.
Qed
.
(
**
Because
[
Empty_set
]
has
no
elements
,
the
fact
of
having
an
element
of
this
type
implies
anything
.
We
use
[
destruct
1
]
instead
of
[
destruct
x
]
in
the
proof
because
unused
quantified
variables
are
relegated
to
being
referred
to
by
number
.
(
There
is
a
good
reason
for
this
,
related
to
the
unity
of
quantifiers
and
dependent
function
types
.
)
(
**
Because
[
Empty_set
]
has
no
elements
,
the
fact
of
having
an
element
of
this
type
implies
anything
.
We
use
[
destruct
1
]
instead
of
[
destruct
x
]
in
the
proof
because
unused
quantified
variables
are
relegated
to
being
referred
to
by
number
.
(
There
is
a
good
reason
for
this
,
related
to
the
unity
of
quantifiers
and
implication
.
An
implication
is
just
a
quantification
over
a
proof
,
where
the
quantified
variable
is
never
used
.
It
generally
makes
more
sense
to
refer
to
implication
hypotheses
by
number
than
by
name
,
and
Coq
treats
our
quantifier
over
an
unused
variable
as
an
implication
in
determining
the
proper
behavior
.
)
We
can
see
the
induction
principle
that
made
this
proof
so
easy
:
*
)
...
...
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