Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free.

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:

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

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:

    let "?case" = "?P {}"
    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.

share|improve this question
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

1 Answer 1

up vote 3 down vote accepted

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

  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
    case (singleton x)
    then show ?thesis sorry

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.

share|improve this answer
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

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.