Proof handling¶
In Coq’s proof editing mode all toplevel commands documented in Chapter Vernacular commands remain available and the user has access to specialized commands dealing with proof development pragmas documented in this section. They can also use some other specialized commands called tactics. They are the very tools allowing the user to deal with logical reasoning. They are documented in Chapter Tactics.
Coq user interfaces usually have a way of marking whether the user has
switched to proof editing mode. For instance, in coqtop the prompt Coq <
is changed into
ident <
where ident
is the declared name of the theorem currently edited.
At each stage of a proof development, one has a list of goals to prove. Initially, the list consists only in the theorem itself. After having applied some tactics, the list of goals contains the subgoals generated by the tactics.
To each subgoal is associated a number of hypotheses called the local context
of the goal. Initially, the local context contains the local variables and
hypotheses of the current section (see Section Assumptions) and
the local variables and hypotheses of the theorem statement. It is enriched by
the use of certain tactics (see e.g. intro
).
When a proof is completed, the message Proof completed
is displayed.
One can then register this proof as a defined constant in the
environment. Because there exists a correspondence between proofs and
terms of λcalculus, known as the CurryHoward isomorphism
[How80][Bar81][GLT89][Hue89], Coq stores proofs as terms of Cic. Those
terms are called proof terms.

Error
No focused proof.
¶ Coq raises this error message when one attempts to use a proof editing command out of the proof editing mode.
Switching on/off the proof editing mode¶
The proof editing mode is entered by asserting a statement, which typically is
the assertion of a theorem using an assertion command like Theorem
. The
list of assertion commands is given in Assertions and proofs. The command
Goal
can also be used.

Command
Goal form
¶ This is intended for quick assertion of statements, without knowing in advance which name to give to the assertion, typically for quick testing of the provability of a statement. If the proof of the statement is eventually completed and validated, the statement is then bound to the name
Unnamed_thm
(or a variant of this name not already used for another statement).

Command
Qed
¶ This command is available in interactive editing proof mode when the proof is completed. Then
Qed
extracts a proof term from the proof script, switches back to Coq toplevel and attaches the extracted proof term to the declared name of the original goal. This name is added to the environment as an opaque constant.
Error
Attempt to save an incomplete proof.
¶
Note
Sometimes an error occurs when building the proof term, because tactics do not enforce completely the term construction constraints.
The user should also be aware of the fact that since the proof term is completely rechecked at this point, one may have to wait a while when the proof is large. In some exceptional cases one may even incur a memory overflow.

Variant
Defined
¶ Same as
Qed
but the proof is then declared transparent, which means that its content can be explicitly used for type checking and that it can be unfolded in conversion tactics (see Performing computations,Opaque
,Transparent
).

Error

Command
Admitted
¶ This command is available in interactive editing mode to give up the current proof and declare the initial goal as an axiom.

Command
Abort
¶ This command cancels the current proof development, switching back to the previous proof development, or to the Coq toplevel if no other proof was edited.

Error
No focused proof (No proofediting in progress).
¶

Variant
Abort All
Aborts all current goals.

Error

Command
Proof term
¶ This command applies in proof editing mode. It is equivalent to
exact term. Qed.
That is, you have to give the full proof in one gulp, as a proof term (see Section Applying theorems).

Command
Proof
¶ Is a noop which is useful to delimit the sequence of tactic commands which start a proof, after a
Theorem
command. It is a good practice to useProof
as an opening parenthesis, closed in the script with a closingQed
.See also

Command
Proof using ident+
¶ This command applies in proof editing mode. It declares the set of section variables (see Assumptions) used by the proof. At
Qed
time, the system will assert that the set of section variables actually used in the proof is a subset of the declared one.The set of declared variables is closed under type dependency. For example if
T
is variable and a is a variable of typeT
, the commandsProof using a
andProof using T a
are actually equivalent.
Variant
Proof using ident+ with tactic
Combines in a single line
Proof with
andProof using
.See also

Variant
Proof using All
Use all section variables.

Variant
Proof using Type?
Use only section variables occurring in the statement.

Variant
Proof using Type*
The
*
operator computes the forward transitive closure. E.g. if the variableH
has typep < 5
thenH
is inp*
sincep
occurs in the type ofH
.Type*
is the forward transitive closure of the entire set of section variables occurring in the statement.

Variant
Proof using collection1 + collection2
Use section variables from the union of both collections. See Name a set of section hypotheses for Proof using to know how to form a named collection.

Variant
Proof using collection1  collection2
Use section variables which are in the first collection but not in the second one.

Variant
Proof using collection  (ident+)
Use section variables which are in the first collection but not in the list of
ident
.

Variant
Proof using collection *
Use section variables in the forward transitive closure of the collection. The
*
operator binds stronger than+
and
.

Variant
Proof using options¶
The following options modify the behavior of Proof using
.

Option
Default Proof Using "expression"
¶ Use
expression
as the defaultProof using
value. E.g.Set Default Proof Using "a b"
will complete allProof
commands not followed by ausing
part withusing a b
.
Name a set of section hypotheses for Proof using
¶

Command
Collection ident := expression
¶ This can be used to name a set of section hypotheses, with the purpose of making
Proof using
annotations more compact.Example
Define the collection named
Some
containingx
,y
andz
:Collection Some := x y z.
Define the collection named
Fewer
containing onlyx
andy
:Collection Fewer := Some  z
Define the collection named
Many
containing the set union or set difference ofFewer
andSome
:Collection Many := Fewer + Some Collection Many := Fewer  Some
Define the collection named
Many
containing the set difference ofFewer
and the unnamed collectionx y
:Collection Many := Fewer  (x y)

Command
Existential num := term
¶ This command instantiates an existential variable.
num
is an index in the list of uninstantiated existential variables displayed byShow Existentials
.This command is intended to be used to instantiate existential variables when the proof is completed but some uninstantiated existential variables remain. To instantiate existential variables during proof edition, you should use the tactic
instantiate
.

Command
Grab Existential Variables
¶ This command can be run when a proof has no more goal to be solved but has remaining uninstantiated existential variables. It takes every uninstantiated existential variable and turns it into a goal.
Requesting information¶

Command
Show
¶ This command displays the current goals.

Error
No focused proof.

Variant
Show ident
Displays the named goal
ident
. This is useful in particular to display a shelved goal but only works if the corresponding existential variable has been named by the user (see Existential variables) as in the following example.Example
 Goal exists n, n = 0.
 1 subgoal ============================ exists n : nat, n = 0
 eexists ?[n].
 1 focused subgoal (shelved: 1) ============================ ?n = 0
 Show n.
 subgoal n is: ============================ nat

Variant
Show Script
¶ Displays the whole list of tactics applied from the beginning of the current proof. This tactics script may contain some holes (subgoals not yet proved). They are printed under the form
<Your Tactic Text here>
.

Variant
Show Proof
¶ It displays the proof term generated by the tactics that have been applied. If the proof is not completed, this term contain holes, which correspond to the subterms which are still to be constructed. These holes appear as a question mark indexed by an integer, and applied to the list of variables in the context, since it may depend on them. The types obtained by abstracting away the context from the type of each placeholder are also printed.

Variant
Show Conjectures
¶ It prints the list of the names of all the theorems that are currently being proved. As it is possible to start proving a previous lemma during the proof of a theorem, this list may contain several names.

Variant
Show Intro
¶ If the current goal begins by at least one product, this command prints the name of the first product, as it would be generated by an anonymous
intro
. The aim of this command is to ease the writing of more robust scripts. For example, with an appropriate Proof General macro, it is possible to transform any anonymousintro
into a qualified one such asintro y13
. In the case of a nonproduct goal, it prints nothing.

Variant
Show Intros
¶ This command is similar to the previous one, it simulates the naming process of an
intros
.

Variant
Show Existentials
¶ It displays the set of all uninstantiated existential variables in the current proof tree, along with the type and the context of each variable.

Variant
Show Match ident
This variant displays a template of the Gallina
match
construct with a branch for each constructor of the typeident
Example
 Show Match nat.
 match # with  O =>  S x => end

Error
Unknown inductive type.
¶

Variant
Show Universes
¶ It displays the set of all universe constraints and its normalized form at the current stage of the proof, useful for debugging universe inconsistencies.

Error

Command
Guarded
¶ Some tactics (e.g.
refine
) allow to build proofs using fixpoint or cofixpoint constructions. Due to the incremental nature of interactive proof construction, the check of the termination (or guardedness) of the recursive calls in the fixpoint or cofixpoint constructions is postponed to the time of the completion of the proof.The command
Guarded
allows checking if the guard condition for fixpoint and cofixpoint is violated at some time of the construction of the proof without having to wait the completion of the proof.
Controlling the effect of proof editing commands¶

Option
Hyps Limit num
¶ This option controls the maximum number of hypotheses displayed in goals after the application of a tactic. All the hypotheses remain usable in the proof development. When unset, it goes back to the default mode which is to print all available hypotheses.

Flag
Automatic Introduction
¶ This option controls the way binders are handled in assertion commands such as
Theorem ident binders? : term
. When the option is on, which is the default, binders are automatically put in the local context of the goal to prove.When the option is off, binders are discharged on the statement to be proved and a tactic such as
intro
(see Section Managing the local context) has to be used to move the assumptions to the local context.
Controlling memory usage¶
When experiencing high memory usage the following commands can be used to force Coq to optimize some of its internal data structures.

Command
Optimize Proof
¶ This command forces Coq to shrink the data structure used to represent the ongoing proof.

Command
Optimize Heap
¶ This command forces the OCaml runtime to perform a heap compaction. This is in general an expensive operation. See: OCaml Gc There is also an analogous tactic
optimize_heap
.