Cases : tactic
STRUCTURE
SYNOPSIS
Performs case analysis on the variable of the leading universally quantified variable of the goal.
LIBRARY
BasicProvers
DESCRIPTION
When applied to a universally quantified goal ?- !u. G, Cases performs a case-split, based on the cases theorem for the type of u stored in the global TypeBase database.

The cases theorem for a type ty will be of the form:

   |- !v:ty. (?x11...x1n1. v = C1 x11 ... x1n1) \/ .... \/
             (?xm1...xmnm. v = Cm xm1 ... xmnm)
where there is no requirement for there to be more than one disjunct, nor for there to be any particular number of existentially quantified variables in any disjunct. For example, the cases theorem for natural numbers initially in the TypeBase is:
   |- !n. (n = 0) \/ (?m. n = SUC m)
Case-splitting consists of specialising the cases theorem with the variable from the goal and then generating as many sub-goals as there are disjuncts in the cases theorem, where in each sub-goal (including the assumptions) the variable has been replaced by an expression involving the given ‘constructor’ (the Ci’s above) applied to as many fresh variables as appropriate.
FAILURE
Fails if the goal is not universally quantified, or if the type of the universally quantified variable does not have a case theorem in the TypeBase, as will happen, for example, with variable types.
EXAMPLE
If we have defined the following type:
   - Hol_datatype `foo = Bar of num | Baz of bool`;
   > val it = () : unit
and the following function:
   - val foofn_def = Define `(foofn (Bar n) = n + 10) /\
                             (foofn (Baz x) = 10)`;
   > val foofn_def =
       |- (!n. foofn (Bar n) = n + 10) /\
           !x. foofn (Baz x) = 10 : thm
then it is possible to make progress with the goal !x. foofn x >= 10 by applying the tactic Cases, thus:
                    ?- !x. foofn x >= 10
   ======================================================  Cases
    ?- foofn (Bar n) >= 10        ?- foofn (Baz b) >= 10
producing two new goals, one for each constructor of the type.
SEEALSO
HOL  Kananaskis-13