# How can I bind the schematic variable ?case in a rule for proof by cases?

I would like to define a rule for proof by cases, to be used with `proof (cases rule: <rule-name>)`. I managed to use the `case_names` and `consumes` parameters, but I did not manage to bind the schematic variable `?case`, so that, inside a case of a proof using my rule, one can write `show ?case ...`. How do I bind it?

Concretely: I have the Mizar-inspired notion of a trivial set, i.e. empty or singleton set. I would like to prove properties of trivial sets by empty vs. singleton case analysis. So far I have:

``````definition trivial where "trivial x = (x ⊆ {the_elem x})"

lemma trivial_cases [case_names empty singleton, consumes 1]:
assumes "trivial X"
assumes empty: "P {}"
and singleton: "⋀ x . X = {x} ⟹ P {x}"
shows "P X"
using assms unfolding trivial_def by (metis subset_singletonD)
``````

and I can make use of this as follows:

``````notepad
begin
fix Q
fix X::"'a set"
have "trivial X" sorry
then have "Q X"
proof (cases rule: trivial_cases)
case empty
show "Q {}" sorry
next
case (singleton x)
show "Q {x}" sorry
qed
end
``````

But I cannot use `show ?case`. If I try, it gives me the error message "Unbound schematic variable: ?case". `print_cases` inside the proof outputs the following:

``````cases:
empty:
let "?case" = "?P {}"
singleton:
fix x_
let "?case" = "?P {x_}"
assume "X = {x_}"
``````

Which suggests that it doesn't work because `?P` is not bound to `trivial`.

BTW: The full context in which I am using this can be seen at https://github.com/formare/auctions/blob/master/isabelle/Auction/SetUtils.thy.

-
`cases` AFAIK never binds `?case`. Maybe you want to use the `induct` method, which does? –  Joachim Breitner Sep 8 '13 at 19:44
Thanks, that works. I just hadn't thought of trying it, as using “induction” to prove a finite statement seemed strange to me. And indeed a different pattern has been suggested here. –  Christoph Lange Sep 9 '13 at 5:43

As Joachim already mentioned, unlike `induct`, the `cases` method does not bind the schematic variable `?case`. I would say the "canonical" way of conducting case analysis (as a proof method) conforms to this setup, since typically only different assumptions -- which taken together are exhaustive -- are considered, whereas the conclusion stays the same (abbreviated by `?thesis` in Isabelle) throughout the different cases. I would set up your `trivial_cases` as follows:

``````lemma trivial_cases [consumes 1, case_names empty singleton]:
assumes "trivial X" and "X = {} ⟹ P" and "⋀x . X = {x} ⟹ P"
shows "P"
using assms by (auto simp: trivial_def)
``````

Then you can use it like

``````notepad
begin
fix P and X :: "'a set"
have "trivial X" sorry
then have "P X"
proof (cases rule: trivial_cases)
case empty
then show ?thesis sorry
next
case (singleton x)
then show ?thesis sorry
qed
end
``````

where the simplifier or explicit unfolding takes care of specializing `X` to `{}` and `{x}`, respectively.

Side Note: You can further tune `trivial_cases` by adding the attribtue `cases pred: trivial`. Then, whenever `trivial ?X` is the major assumption fed to `cases`, the rule `trivial_cases` is used implicitly, i.e., you can do the following

``````have "trivial X" sorry
then have "P X"
proof (cases)
``````

in the above proof.

-
Thanks, that works very well. I have now modified my sources accordingly. `cases pred` actually also allows me to get rid of `consumes 1`, as the latter is the default for `cases pred` (`isabelle doc isar-ref` section 6.6.3). –  Christoph Lange Sep 9 '13 at 5:55
Although the feature to enable `proof induct` and `proof cases` without a rule is very slick I have later regretted using it, when I was reading my theories a few months later. Explicit rules are more stable! –  Joachim Breitner Sep 9 '13 at 7:21
Good point. However if Isabelle supported (I think it doesn't) displaying what implicit rule it applied whenever you write `proof` or `proof (cases)` or `proof (induct)` without explicitly referencing a rule, this would be easier to manage. –  Christoph Lange Sep 9 '13 at 8:00
@JoachimBreitner: I kind of disagree ;). If I have an explicit rule, the only additional information (at least at this point in the sources) I get is the name of the rule, which might be completely useless. A combination of implicit rules and explicitly stating assumptions (instead of using `case (...)`) is the most readable variant I think. The cost is that you have to type more and maybe duplicate some formulas. (But of course I see the value of being able to click on a rule name and get to the corresponding proof.) –  chris Sep 9 '13 at 8:09
I agree with @ChristophLange: It would be all fine if `proof`, `proof cases` et. al. would tell me what they are doing. –  Joachim Breitner Sep 9 '13 at 8:37