Program derivation
==================
Rocq comes with an extension called ``Derive``, which supports program
derivation. Typically in the style of Bird and Meertens formalism or derivations
of program refinements. To use the Derive extension it must first be
required with ``From Corelib Require Derive``. When the extension is loaded,
it provides the following command:
.. cmd:: Derive @open_binders in @type as @ident
Derive @open_binders SuchThat @type As @ident
where :n:`@open_binders` is a list of the form
:n:`@ident__i : @type__i` which can appear in :n:`@type`. This
command opens a new proof presenting the user with a goal for
:n:`@type` in which each name :n:`@ident__i` is bound to an
existential variable of same name :g:`?ident__i` (these
existential variables are shelved goals, as
described in :tacn:`shelve`).
When the proof is complete, Rocq defines :term:`constants <constant>`
for each :n:`@ident__i` and for :n:`@ident`:
+ The first ones, named :n:`@ident__i`, are defined as the proof of the
shelved goals (which are also the value of :n:`?ident__i`). They are always
transparent.
+ The final one is named :n:`@ident`. It has type :n:`@type`, and its :term:`body` is
the proof of the initially visible goal. It is opaque if the proof
ends with :cmd:`Qed`, and transparent if the proof ends with :cmd:`Defined`.
.. example::
.. rocqtop:: none
Module Nat.
Axiom mul_add_distr_l : forall n m p : nat, n * (m + p) = n * m + n * p.
End Nat.
.. rocqtop:: all
From Corelib Require Derive.
Section P.
Variables (n m k:nat).
Derive j p in ((k*n)+(k*m) = j*p) as h.
Proof.
rewrite <- Nat.mul_add_distr_l.
subst j p.
reflexivity.
Qed.
End P.
Print j.
Print p.
Check h.
Any property can be used as `type`, not only an equation. In particular,
it could be an order relation specifying some form of program
refinement or a non-executable property from which deriving a program
is convenient.
.. note::
The syntax :n:`Derive @open_binders SuchThat @type As @ident` is obsolete
and to be avoided.
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