ADTAbstract Data Types
- Introduction to Objective Caml, chapters 12 and 13. Jason
Hickey, 2008. Available from
https://ocaml.org/learn/books.html.
- The OCaml System Manual, chapter 2. Xavier Leroy et al., 2020. Available from http://caml.inria.fr/pub/docs/manual-ocaml/.
The Table ADT
A table is a binding from keys to values. It is total,
meaning it binds all keys.
Keys are natural numbers.
Values are an arbitrary type V.
The default value to which keys are bound.
empty is the table that binds all keys to the default value.
get k t is the value v to which k is bound in t.
set k v t is the table that binds k to v and otherwise has
the same bindings as t.
The following three axioms are an equational specification for
the table ADT.
Axiom get_empty_default : ∀ (k : key),
get k empty = default.
Axiom get_set_same : ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Axiom get_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
End Table.
get k empty = default.
Axiom get_set_same : ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Axiom get_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
End Table.
Implementing Table with Functions
Functor FunTable takes as input a module of type
ValType, which must therefore contain a type V. As output,
FunTable produces a module of type Table. By writing <:
Table, below, we ask Coq to check that the output module contains
all the components required by Table.
Module FunTable (VT : ValType) <: Table.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
A table is a function from keys to values.
Definition table := key → V.
Definition empty : table :=
fun _ ⇒ default.
Definition get (k : key) (t : table) : V :=
t k.
Definition set (k : key) (v : V) (t : table) : table :=
fun k' ⇒ if k =? k' then v else t k'.
Definition empty : table :=
fun _ ⇒ default.
Definition get (k : key) (t : table) : V :=
t k.
Definition set (k : key) (v : V) (t : table) : table :=
fun k' ⇒ if k =? k' then v else t k'.
The implementation must prove the theorems that the interface
specified as axioms.
Theorem get_empty_default: ∀ (k : key),
get k empty = default.
Proof. intros. unfold get, empty. reflexivity. Qed.
Theorem get_set_same: ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Proof. intros. unfold get, set. bdall. Qed.
Theorem get_set_other: ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
Proof. intros. unfold get, set. bdall. Qed.
End FunTable.
get k empty = default.
Proof. intros. unfold get, empty. reflexivity. Qed.
Theorem get_set_same: ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Proof. intros. unfold get, set. bdall. Qed.
Theorem get_set_other: ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
Proof. intros. unfold get, set. bdall. Qed.
End FunTable.
As an example, let's instantiate FunTable with strings as
values.
Module StringVal.
Definition V := string.
Definition default := ""%string.
End StringVal.
Module FunTableExamples.
Module StringFunTable := FunTable StringVal.
Import StringFunTable.
Open Scope string_scope.
Example ex1 : get 0 empty = "".
Proof. reflexivity. Qed.
Example ex2 : get 0 (set 0 "A" empty) = "A".
Proof. reflexivity. Qed.
Example ex3 : get 1 (set 0 "A" empty) = "".
Proof. reflexivity. Qed.
End FunTableExamples.
Definition V := string.
Definition default := ""%string.
End StringVal.
Module FunTableExamples.
Module StringFunTable := FunTable StringVal.
Import StringFunTable.
Open Scope string_scope.
Example ex1 : get 0 empty = "".
Proof. reflexivity. Qed.
Example ex2 : get 0 (set 0 "A" empty) = "A".
Proof. reflexivity. Qed.
Example ex3 : get 1 (set 0 "A" empty) = "".
Proof. reflexivity. Qed.
End FunTableExamples.
Exercise: 2 stars, standard, optional (NatFunTableExamples)
Implementing Table with Lists
Exercise: 3 stars, standard (lists_table)
Module ListsTable (VT : ValType) <: Table.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
Definition table := list (key × V).
Definition empty : table := [].
Fixpoint get (k : key) (t : table) : V
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition set (k : key) (v : V) (t : table) : table
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Theorem get_empty_default: ∀ (k : key),
get k empty = default.
Proof.
(* FILL IN HERE *) Admitted.
Theorem get_set_same: ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Proof.
(* FILL IN HERE *) Admitted.
Theorem get_set_other: ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
Proof.
(* FILL IN HERE *) Admitted.
End ListsTable.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
Definition table := list (key × V).
Definition empty : table := [].
Fixpoint get (k : key) (t : table) : V
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition set (k : key) (v : V) (t : table) : table
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Theorem get_empty_default: ∀ (k : key),
get k empty = default.
Proof.
(* FILL IN HERE *) Admitted.
Theorem get_set_same: ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Proof.
(* FILL IN HERE *) Admitted.
Theorem get_set_other: ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
Proof.
(* FILL IN HERE *) Admitted.
End ListsTable.
Instantiate your table and prove the following facts.
Module StringListsTableExamples.
Module StringListsTable := ListsTable StringVal.
Import StringListsTable.
Open Scope string_scope.
Example ex1 : get 0 empty = "".
Proof.
(* FILL IN HERE *) Admitted.
Example ex2 : get 0 (set 0 "A" empty) = "A".
Proof.
(* FILL IN HERE *) Admitted.
Example ex3 : get 1 (set 0 "A" empty) = "".
Proof.
(* FILL IN HERE *) Admitted.
End StringListsTableExamples.
☐
Module StringListsTable := ListsTable StringVal.
Import StringListsTable.
Open Scope string_scope.
Example ex1 : get 0 empty = "".
Proof.
(* FILL IN HERE *) Admitted.
Example ex2 : get 0 (set 0 "A" empty) = "A".
Proof.
(* FILL IN HERE *) Admitted.
Example ex3 : get 1 (set 0 "A" empty) = "".
Proof.
(* FILL IN HERE *) Admitted.
End StringListsTableExamples.
☐
Implementing Table with BSTs
Module TreeTable (VT : ValType) <: Table.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
Definition table := tree V.
Definition empty : table :=
@empty_tree V.
Definition get (k : key) (t: table) : V :=
lookup default k t.
Definition set (k : key) (v : V) (t : table) : table :=
insert k v t.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
Definition table := tree V.
Definition empty : table :=
@empty_tree V.
Definition get (k : key) (t: table) : V :=
lookup default k t.
Definition set (k : key) (v : V) (t : table) : table :=
insert k v t.
The three basic equations we proved about tree in
SearchTree make short work of the theorems we need to
prove for Table.
Theorem get_empty_default: ∀ (k : key),
get k empty = default.
Proof.
apply lookup_empty.
Qed.
Theorem get_set_same: ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Proof.
intros. unfold get, set. apply lookup_insert_eq.
Qed.
Theorem get_set_other: ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
Proof.
intros. unfold get, set. apply lookup_insert_neq. assumption.
Qed.
End TreeTable.
get k empty = default.
Proof.
apply lookup_empty.
Qed.
Theorem get_set_same: ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Proof.
intros. unfold get, set. apply lookup_insert_eq.
Qed.
Theorem get_set_other: ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
Proof.
intros. unfold get, set. apply lookup_insert_neq. assumption.
Qed.
End TreeTable.
Tables with an elements Operation
A First Attempt at ETable
Include, as the name suggests, includes all the declarations
from Table. Not only does that save keystrokes, it also means
if we ever update Table to have new operations or new types,
they automatically get included here, too.
Include Table.
Parameter bound : key → table → bool.
Parameter elements : table → list (key × V).
Axiom elements_complete : ∀ (k : key) (v : V) (t : table),
bound k t = true →
get k t = v →
In (k, v) (elements t).
Axiom elements_correct : ∀ (k : key) (v : V) (t : table),
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
End ETable_first_attempt.
Parameter bound : key → table → bool.
Parameter elements : table → list (key × V).
Axiom elements_complete : ∀ (k : key) (v : V) (t : table),
bound k t = true →
get k t = v →
In (k, v) (elements t).
Axiom elements_correct : ∀ (k : key) (v : V) (t : table),
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
End ETable_first_attempt.
We proved in SearchTree that the BST elements operation is
correct and complete. So we ought to be able to implement
ETable with BSTs. Let's try.
Include all the definitions from TreeTable, instantiated on
VT.
Thanks to the Include, we now have all the tree operations
defined "for free" in this module. For example:
Check get : key → table → V.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k t.
Definition elements (t : table) : list (key × V) :=
SearchTree.elements t.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup. unfold get in Hlookup.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k t.
Definition elements (t : table) : list (key × V) :=
SearchTree.elements t.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup. unfold get in Hlookup.
pose proof t as H is equivalent to assert (H : ...the type
of t...). { apply t. } but saves some keystrokes.
pose proof (SearchTree.elements_complete) as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete with default.
-
unfold elements_complete_spec in Hcomplete.
apply Hcomplete with default.
-
Stuck! We don't know that t satisfies the BST invariant.
Admitted.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t Hin.
pose proof (SearchTree.elements_correct) as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect.
-
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t Hin.
pose proof (SearchTree.elements_correct) as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect.
-
Again stuck because of the BST invariant.
A Revised ETable
Module Type ETable.
Include Table.
Parameter rep_ok : table → Prop.
Parameter bound : key → table → bool.
Parameter elements : table → list (key × V).
Include Table.
Parameter rep_ok : table → Prop.
Parameter bound : key → table → bool.
Parameter elements : table → list (key × V).
empty and set produce valid representations.
Axiom empty_ok : rep_ok empty.
Axiom set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Axiom set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
The specification of bound:
Axiom bound_empty : ∀ (k : key),
bound k empty = false.
Axiom bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Axiom bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
bound k empty = false.
Axiom bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Axiom bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
The specification of elements:
Axiom elements_complete : ∀ (k : key) (v : V) (t : table),
rep_ok t →
bound k t = true →
get k t = v →
In (k, v) (elements t).
Axiom elements_correct : ∀ (k : key) (v : V) (t : table),
rep_ok t →
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
End ETable.
Module TreeETable (VT : ValType) <: ETable.
Include TreeTable VT.
Definition rep_ok (t : table) : Prop :=
BST t.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k t.
Definition elements (t : table) : list (key × V) :=
SearchTree.elements t.
Theorem empty_ok : rep_ok empty.
Proof.
apply empty_tree_BST.
Qed.
Theorem set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Proof.
apply insert_BST.
Qed.
Theorem bound_empty : ∀ (k : key),
bound k empty = false.
Proof.
reflexivity.
Qed.
Theorem bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Proof.
intros k v t. unfold bound, set. induction t; bdall.
Qed.
Theorem bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Proof.
intros k k' v t Hneq. unfold bound, set. induction t; bdall.
Qed.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
rep_ok t →
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup.
pose proof SearchTree.elements_complete as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete; assumption.
Qed.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
rep_ok t →
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t. simpl. intros Hin.
pose proof SearchTree.elements_correct as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect; assumption.
Qed.
End TreeETable.
rep_ok t →
bound k t = true →
get k t = v →
In (k, v) (elements t).
Axiom elements_correct : ∀ (k : key) (v : V) (t : table),
rep_ok t →
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
End ETable.
Module TreeETable (VT : ValType) <: ETable.
Include TreeTable VT.
Definition rep_ok (t : table) : Prop :=
BST t.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k t.
Definition elements (t : table) : list (key × V) :=
SearchTree.elements t.
Theorem empty_ok : rep_ok empty.
Proof.
apply empty_tree_BST.
Qed.
Theorem set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Proof.
apply insert_BST.
Qed.
Theorem bound_empty : ∀ (k : key),
bound k empty = false.
Proof.
reflexivity.
Qed.
Theorem bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Proof.
intros k v t. unfold bound, set. induction t; bdall.
Qed.
Theorem bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Proof.
intros k k' v t Hneq. unfold bound, set. induction t; bdall.
Qed.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
rep_ok t →
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup.
pose proof SearchTree.elements_complete as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete; assumption.
Qed.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
rep_ok t →
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t. simpl. intros Hin.
pose proof SearchTree.elements_correct as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect; assumption.
Qed.
End TreeETable.
Now we can use the table.
Module StringTreeETableExample.
Module StringTreeETable := TreeETable StringVal.
Import StringTreeETable.
Open Scope string_scope.
Example ex1 :
In (0, "A") (elements (set 0 "A" (set 1 "B" empty))).
Proof.
apply elements_complete;
auto using empty_ok, set_ok, bound_set_same, get_set_same.
Qed.
End StringTreeETableExample.
Module StringTreeETable := TreeETable StringVal.
Import StringTreeETable.
Open Scope string_scope.
Example ex1 :
In (0, "A") (elements (set 0 "A" (set 1 "B" empty))).
Proof.
apply elements_complete;
auto using empty_ok, set_ok, bound_set_same, get_set_same.
Qed.
End StringTreeETableExample.
Encapsulation with the Coq Module System (Advanced)
Example exposed_trees_ex :
(StringTreeETableExample.StringTreeETable.get 0 (T E 0 "A" E) = "A")%string.
Proof.
unfold StringTreeETableExample.StringTreeETable.get. (* we can see lookup *)
reflexivity.
Qed.
(StringTreeETableExample.StringTreeETable.get 0 (T E 0 "A" E) = "A")%string.
Proof.
unfold StringTreeETableExample.StringTreeETable.get. (* we can see lookup *)
reflexivity.
Qed.
Like many languages, Coq makes it possible to encapsulate
these details, meaning that they become hidden outside the module.
It's a simple matter of changing the <: syntax to : in the
functor's type. The only change in the implementation below is
that one character.
The : syntax makes the module type opaque: only what is
revealed in the type is available for code outside the module to
use. The <: syntax, however, makes the module type
transparent: the module must conform to the type, but everything
about the module is still revealed.
Module TreeETableFullyEncapsulated (VT : ValType) : ETable.
Include TreeTable VT.
Definition rep_ok (t : table) : Prop :=
BST t.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k t.
Definition elements (t : table) : list (key × V) :=
SearchTree.elements t.
Theorem empty_ok : rep_ok empty.
Proof.
apply empty_tree_BST.
Qed.
Theorem set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Proof.
apply insert_BST.
Qed.
Theorem bound_empty : ∀ (k : key),
bound k empty = false.
Proof.
reflexivity.
Qed.
Theorem bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Proof.
intros k v t. unfold bound, set. induction t; bdall.
Qed.
Theorem bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Proof.
intros k k' v t Hneq. unfold bound, set. induction t; bdall.
Qed.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
rep_ok t →
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup.
pose proof SearchTree.elements_complete as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete; assumption.
Qed.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
rep_ok t →
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t. simpl. intros Hin.
pose proof SearchTree.elements_correct as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect; assumption.
Qed.
End TreeETableFullyEncapsulated.
Include TreeTable VT.
Definition rep_ok (t : table) : Prop :=
BST t.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k t.
Definition elements (t : table) : list (key × V) :=
SearchTree.elements t.
Theorem empty_ok : rep_ok empty.
Proof.
apply empty_tree_BST.
Qed.
Theorem set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Proof.
apply insert_BST.
Qed.
Theorem bound_empty : ∀ (k : key),
bound k empty = false.
Proof.
reflexivity.
Qed.
Theorem bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Proof.
intros k v t. unfold bound, set. induction t; bdall.
Qed.
Theorem bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Proof.
intros k k' v t Hneq. unfold bound, set. induction t; bdall.
Qed.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
rep_ok t →
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup.
pose proof SearchTree.elements_complete as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete; assumption.
Qed.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
rep_ok t →
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t. simpl. intros Hin.
pose proof SearchTree.elements_correct as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect; assumption.
Qed.
End TreeETableFullyEncapsulated.
Unfortunately, the module is now too encapsulated to be useful:
Module OverlyEncapsulatedExample.
Module StringTreeETableFullyEncapsulated := TreeETableFullyEncapsulated StringVal.
Import StringTreeETableFullyEncapsulated.
Open Scope string_scope.
Fail Example ex1 : get 0 empty = "".
(* fails with an error about "" not having type V *)
End OverlyEncapsulatedExample.
Module StringTreeETableFullyEncapsulated := TreeETableFullyEncapsulated StringVal.
Import StringTreeETableFullyEncapsulated.
Open Scope string_scope.
Fail Example ex1 : get 0 empty = "".
(* fails with an error about "" not having type V *)
End OverlyEncapsulatedExample.
The problem is that the module now hides not only the internal
implementation, but also the value type V. The functor was
instantiated on StringVal, which defines that type as string.
But the output of the functor has type ETable, which doesn't
reveal anything about V except that it is a Type. Note in the
output of the following command how V is printed like an axiom
would be, indicating that nothing is known (externally) about its
implementation:
We need to selectively expose certain implementation details.
We've just seen that V should be exposed. Along with it, we'll
also want default to be exposed. We can accomplish that with an
advanced feature of Coq's module system. The Coq manual doesn't
give this feature a name, but OCaml (in which Coq is implemented)
calls it a sharing constraint, so we'll use that term here. A
sharing constraint enables us to constrain definitions shared by
modules to be the same.
Module Type SimpleTable.
Parameter key : Type.
Parameter V : Type.
Parameter default : V.
Parameter table : Type.
(* We omit everything else for sake of a simple example. *)
End SimpleTable.
Module SimpleStringTable1 : SimpleTable.
Definition key := nat.
Definition V := string.
Definition default : string := "".
Definition table := tree V.
End SimpleStringTable1.
(* V is abstract. *)
Print SimpleStringTable1.V.
Module Type SimpleTable2 := SimpleTable with Definition V := string.
Module SimpleStringTable2 : SimpleTable2.
Definition key := nat.
Definition V := string.
Definition default : string := "".
Definition table := tree V.
End SimpleStringTable2.
(* V is exposed, but default is abstract. *)
Print SimpleStringTable2.V.
Print SimpleStringTable2.default.
Module Type SimpleTable3 := SimpleTable
with Definition V := string
with Definition default := ""%string.
Module SimpleStringTable3 : SimpleTable3.
Definition key := nat.
Definition V := string.
Definition default : string := "".
Definition table := tree V.
End SimpleStringTable3.
(* Both V and default are exposed. *)
Print SimpleStringTable3.V.
Print SimpleStringTable3.default.
Parameter key : Type.
Parameter V : Type.
Parameter default : V.
Parameter table : Type.
(* We omit everything else for sake of a simple example. *)
End SimpleTable.
Module SimpleStringTable1 : SimpleTable.
Definition key := nat.
Definition V := string.
Definition default : string := "".
Definition table := tree V.
End SimpleStringTable1.
(* V is abstract. *)
Print SimpleStringTable1.V.
Module Type SimpleTable2 := SimpleTable with Definition V := string.
Module SimpleStringTable2 : SimpleTable2.
Definition key := nat.
Definition V := string.
Definition default : string := "".
Definition table := tree V.
End SimpleStringTable2.
(* V is exposed, but default is abstract. *)
Print SimpleStringTable2.V.
Print SimpleStringTable2.default.
Module Type SimpleTable3 := SimpleTable
with Definition V := string
with Definition default := ""%string.
Module SimpleStringTable3 : SimpleTable3.
Definition key := nat.
Definition V := string.
Definition default : string := "".
Definition table := tree V.
End SimpleStringTable3.
(* Both V and default are exposed. *)
Print SimpleStringTable3.V.
Print SimpleStringTable3.default.
Putting sharing constraints to use, let's expose V and default
in our implementation of tree-based tables.
Module TreeETableEncapsulated (VT : ValType) : (ETable with Definition V := VT.V with Definition default := VT.default).
Include TreeTable VT.
Definition rep_ok (t : table) : Prop :=
BST t.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k t.
Definition elements (t : table) : list (key × V) :=
SearchTree.elements t.
Theorem empty_ok : rep_ok empty.
Proof.
apply empty_tree_BST.
Qed.
Theorem set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Proof.
apply insert_BST.
Qed.
Theorem bound_empty : ∀ (k : key),
bound k empty = false.
Proof.
reflexivity.
Qed.
Theorem bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Proof.
intros k v t. unfold bound, set. induction t; bdall.
Qed.
Theorem bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Proof.
intros k k' v t Hneq. unfold bound, set. induction t; bdall.
Qed.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
rep_ok t →
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup.
pose proof SearchTree.elements_complete as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete; assumption.
Qed.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
rep_ok t →
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t. simpl. intros Hin.
pose proof SearchTree.elements_correct as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect; assumption.
Qed.
End TreeETableEncapsulated.
Module NicelyEncapsulatedExample.
Module StringTreeETableEncapsulated := TreeETableEncapsulated StringVal.
Import StringTreeETableEncapsulated.
Open Scope string_scope.
Example ex1 : get 0 empty = "".
Proof.
(* We can't directly simplify, because get is encapsulated. *)
Fail reflexivity.
(* But we can use the specifications exposed in the interface. *)
apply get_empty_default.
Qed.
(* We can't fabricate trees with T and E anymore, because tree
is encapsulated. *)
Fail Example ex2 : get 0 (T E 0 "A" E) = "A".
End NicelyEncapsulatedExample.
Include TreeTable VT.
Definition rep_ok (t : table) : Prop :=
BST t.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k t.
Definition elements (t : table) : list (key × V) :=
SearchTree.elements t.
Theorem empty_ok : rep_ok empty.
Proof.
apply empty_tree_BST.
Qed.
Theorem set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Proof.
apply insert_BST.
Qed.
Theorem bound_empty : ∀ (k : key),
bound k empty = false.
Proof.
reflexivity.
Qed.
Theorem bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Proof.
intros k v t. unfold bound, set. induction t; bdall.
Qed.
Theorem bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Proof.
intros k k' v t Hneq. unfold bound, set. induction t; bdall.
Qed.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
rep_ok t →
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup.
pose proof SearchTree.elements_complete as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete; assumption.
Qed.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
rep_ok t →
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t. simpl. intros Hin.
pose proof SearchTree.elements_correct as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect; assumption.
Qed.
End TreeETableEncapsulated.
Module NicelyEncapsulatedExample.
Module StringTreeETableEncapsulated := TreeETableEncapsulated StringVal.
Import StringTreeETableEncapsulated.
Open Scope string_scope.
Example ex1 : get 0 empty = "".
Proof.
(* We can't directly simplify, because get is encapsulated. *)
Fail reflexivity.
(* But we can use the specifications exposed in the interface. *)
apply get_empty_default.
Qed.
(* We can't fabricate trees with T and E anymore, because tree
is encapsulated. *)
Fail Example ex2 : get 0 (T E 0 "A" E) = "A".
End NicelyEncapsulatedExample.
Note what we've happily achieved: we can reason about the behavior
of an ADT entirely from its specification, rather than depending
on the implementation code. This is what specification comments
in interfaces attempt to achieve in real-world code.
Develop a nicely-encapsulated interface and implementation of
tree-based tables that exposes the rest of the specification of
elements from SearchTree, including the inverses of
correctness and completenesss, sortedness, and
non-duplication. Send us your solution, so we can include it!
☐
Exercise: 4 stars, advanced, optional (elements_spec)
Model-based Specification
- introduce an abstraction function (or relation) that associates
a concrete value of the ADT implementation with an abstract
value in an already well-understood type; and
- show that the concrete and abstract operations are related in a sensible way.
Definition map_update {V : Type}
(k : key) (v : V) (m : partial_map V) : partial_map V :=
update m k v.
Definition map_find {V : Type} := @find V.
Definition empty_map {V : Type} := @Maps.empty V.
(k : key) (v : V) (m : partial_map V) : partial_map V :=
update m k v.
Definition map_find {V : Type} := @find V.
Definition empty_map {V : Type} := @Maps.empty V.
Now we can define an interface for tables that includes an
abstraction function Abs, and specifications written in terms of
it.
Module Type ETableAbs.
Parameter table : Type.
Definition key := nat.
Parameter V : Type.
Parameter default : V.
Parameter empty : table.
Parameter get : key → table → V.
Parameter set : key → V → table → table.
Parameter bound : key → table → bool.
Parameter elements : table → list (key × V).
Parameter Abs : table → partial_map V.
Parameter rep_ok : table → Prop.
Axiom empty_ok :
rep_ok empty.
Axiom set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Axiom empty_relate :
Abs empty = empty_map.
Axiom bound_relate : ∀ (t : table) (k : key),
rep_ok t →
map_bound k (Abs t) = bound k t.
Axiom lookup_relate : ∀ (t : table) (k : key),
rep_ok t →
map_find default k (Abs t) = get k t.
Axiom insert_relate : ∀ (t : table) (k : key) (v : V),
rep_ok t →
map_update k v (Abs t) = Abs (set k v t).
Axiom elements_relate : ∀ (t : table),
rep_ok t →
Abs t = map_of_list (elements t).
End ETableAbs.
Parameter table : Type.
Definition key := nat.
Parameter V : Type.
Parameter default : V.
Parameter empty : table.
Parameter get : key → table → V.
Parameter set : key → V → table → table.
Parameter bound : key → table → bool.
Parameter elements : table → list (key × V).
Parameter Abs : table → partial_map V.
Parameter rep_ok : table → Prop.
Axiom empty_ok :
rep_ok empty.
Axiom set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Axiom empty_relate :
Abs empty = empty_map.
Axiom bound_relate : ∀ (t : table) (k : key),
rep_ok t →
map_bound k (Abs t) = bound k t.
Axiom lookup_relate : ∀ (t : table) (k : key),
rep_ok t →
map_find default k (Abs t) = get k t.
Axiom insert_relate : ∀ (t : table) (k : key) (v : V),
rep_ok t →
map_update k v (Abs t) = Abs (set k v t).
Axiom elements_relate : ∀ (t : table),
rep_ok t →
Abs t = map_of_list (elements t).
End ETableAbs.
Exercise: 4 stars, standard (list_etable_abs)
Module ListETableAbs (VT : ValType) <: ETableAbs.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
Definition table := list (key × V).
Definition empty : table
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Fixpoint get (k : key) (t : table) : V
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition set (k : key) (v : V) (t : table) : table
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Fixpoint bound (k : key) (t : table) : bool
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition elements (t : table) : list (key × V)
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition Abs (t : table) : partial_map V
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition rep_ok (t : table) : Prop
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Theorem empty_ok : rep_ok empty.
Proof.
(* FILL IN HERE *) Admitted.
Theorem set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Proof.
(* FILL IN HERE *) Admitted.
Theorem empty_relate :
Abs empty = empty_map.
Proof.
(* FILL IN HERE *) Admitted.
Theorem bound_relate : ∀ (t : table) (k : key),
rep_ok t →
map_bound k (Abs t) = bound k t.
Proof.
(* FILL IN HERE *) Admitted.
Theorem lookup_relate : ∀ (t : table) (k : key),
rep_ok t →
map_find default k (Abs t) = get k t.
Proof.
(* FILL IN HERE *) Admitted.
Theorem insert_relate : ∀ (t : table) (k : key) (v : V),
rep_ok t →
map_update k v (Abs t) = Abs (set k v t).
Proof.
(* FILL IN HERE *) Admitted.
Theorem elements_relate : ∀ (t : table),
rep_ok t →
Abs t = map_of_list (elements t).
Proof.
(* FILL IN HERE *) Admitted.
End ListETableAbs.
(* Instantiate functor for sake of autograding. *)
Module StringListETableAbs := ListETableAbs StringVal.
☐
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
Definition table := list (key × V).
Definition empty : table
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Fixpoint get (k : key) (t : table) : V
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition set (k : key) (v : V) (t : table) : table
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Fixpoint bound (k : key) (t : table) : bool
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition elements (t : table) : list (key × V)
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition Abs (t : table) : partial_map V
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition rep_ok (t : table) : Prop
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Theorem empty_ok : rep_ok empty.
Proof.
(* FILL IN HERE *) Admitted.
Theorem set_ok : ∀ (k : key) (v : V) (t : table),
rep_ok t → rep_ok (set k v t).
Proof.
(* FILL IN HERE *) Admitted.
Theorem empty_relate :
Abs empty = empty_map.
Proof.
(* FILL IN HERE *) Admitted.
Theorem bound_relate : ∀ (t : table) (k : key),
rep_ok t →
map_bound k (Abs t) = bound k t.
Proof.
(* FILL IN HERE *) Admitted.
Theorem lookup_relate : ∀ (t : table) (k : key),
rep_ok t →
map_find default k (Abs t) = get k t.
Proof.
(* FILL IN HERE *) Admitted.
Theorem insert_relate : ∀ (t : table) (k : key) (v : V),
rep_ok t →
map_update k v (Abs t) = Abs (set k v t).
Proof.
(* FILL IN HERE *) Admitted.
Theorem elements_relate : ∀ (t : table),
rep_ok t →
Abs t = map_of_list (elements t).
Proof.
(* FILL IN HERE *) Admitted.
End ListETableAbs.
(* Instantiate functor for sake of autograding. *)
Module StringListETableAbs := ListETableAbs StringVal.
☐
Exercise: 3 stars, standard, optional (TreeTableModel)
Give an implementation of ETableAbs using the abstraction function Abs from SearchTree. All the proofs of the relate axioms should be simple applications of the lemmas already proved as exercises in that chapter.
(* Do not modify the following line: *)
Definition manual_grade_for_TreeTableModel : option (nat×string) := None.
☐
Definition manual_grade_for_TreeTableModel : option (nat×string) := None.
☐
Exercise: 2 stars, advanced, optional (TreeTableModel')
Summary of ADT Verification
- Define a representation invariant to characterize which
values of the representation type are legal. Prove that each
operation on the representation type preserves the representation
invariant.
- Using the representation invariant, verify the equational specification.
- Define and verify preservation of the the representation invariant.
- Define an abstraction function that relates the
representation type to another type that is easier to reason
about.
- Prove that operations of the abstract and concrete types commute with the abstraction function.
Another ADT: Queue
Module Type Queue.
Parameter V : Type.
Parameter queue : Type.
Parameter empty: queue.
Parameter is_empty : queue → bool.
Parameter enq : queue → V → queue.
Parameter deq : queue → queue.
Parameter peek : V → queue → V.
Axiom is_empty_empty : is_empty empty = true.
Axiom is_empty_nonempty : ∀ q v, is_empty (enq q v) = false.
Axiom peek_empty : ∀ d, peek d empty = d.
Axiom peek_nonempty : ∀ d q v, peek d (enq q v) = peek v q.
Axiom deq_empty : deq empty = empty.
Axiom deq_nonempty : ∀ q v, deq (enq q v) = if is_empty q then q else enq (deq q) v.
End Queue.
Parameter V : Type.
Parameter queue : Type.
Parameter empty: queue.
Parameter is_empty : queue → bool.
Parameter enq : queue → V → queue.
Parameter deq : queue → queue.
Parameter peek : V → queue → V.
Axiom is_empty_empty : is_empty empty = true.
Axiom is_empty_nonempty : ∀ q v, is_empty (enq q v) = false.
Axiom peek_empty : ∀ d, peek d empty = d.
Axiom peek_nonempty : ∀ d q v, peek d (enq q v) = peek v q.
Axiom deq_empty : deq empty = empty.
Axiom deq_nonempty : ∀ q v, deq (enq q v) = if is_empty q then q else enq (deq q) v.
End Queue.
Exercise: 3 stars, standard (list_queue)
Module ListQueue <: Queue.
Definition V := nat. (* for simplicity *)
Definition queue := list V.
Definition empty : queue
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition is_empty (q : queue) : bool
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition enq (q : queue) (v : V) : queue
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition deq (q : queue) : queue
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition peek (default : V) (q : queue) : V
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Theorem is_empty_empty : is_empty empty = true.
Proof.
(* FILL IN HERE *) Admitted.
Theorem is_empty_nonempty : ∀ q v,
is_empty (enq q v) = false.
Proof.
(* FILL IN HERE *) Admitted.
Theorem peek_empty : ∀ d,
peek d empty = d.
Proof.
(* FILL IN HERE *) Admitted.
Theorem peek_nonempty : ∀ d q v,
peek d (enq q v) = peek v q.
Proof.
(* FILL IN HERE *) Admitted.
Theorem deq_empty :
deq empty = empty.
Proof.
(* FILL IN HERE *) Admitted.
Theorem deq_nonempty : ∀ q v,
deq (enq q v) = if is_empty q then q else enq (deq q) v.
Proof.
(* FILL IN HERE *) Admitted.
End ListQueue.
☐
Definition V := nat. (* for simplicity *)
Definition queue := list V.
Definition empty : queue
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition is_empty (q : queue) : bool
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition enq (q : queue) (v : V) : queue
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition deq (q : queue) : queue
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Definition peek (default : V) (q : queue) : V
(* REPLACE THIS LINE WITH ":= _your_definition_ ." *). Admitted.
Theorem is_empty_empty : is_empty empty = true.
Proof.
(* FILL IN HERE *) Admitted.
Theorem is_empty_nonempty : ∀ q v,
is_empty (enq q v) = false.
Proof.
(* FILL IN HERE *) Admitted.
Theorem peek_empty : ∀ d,
peek d empty = d.
Proof.
(* FILL IN HERE *) Admitted.
Theorem peek_nonempty : ∀ d q v,
peek d (enq q v) = peek v q.
Proof.
(* FILL IN HERE *) Admitted.
Theorem deq_empty :
deq empty = empty.
Proof.
(* FILL IN HERE *) Admitted.
Theorem deq_nonempty : ∀ q v,
deq (enq q v) = if is_empty q then q else enq (deq q) v.
Proof.
(* FILL IN HERE *) Admitted.
End ListQueue.
☐
Module Type QueueAbs.
Parameter V : Type.
Parameter queue : Type.
Parameter empty : queue.
Parameter is_empty : queue → bool.
Parameter enq : queue → V → queue.
Parameter deq : queue → queue.
Parameter peek : V → queue → V.
Parameter Abs : queue → list V.
Axiom empty_relate : Abs empty = [].
Axiom enq_relate : ∀ q v, Abs (enq q v) = (Abs q) ++ [v].
Axiom peek_relate : ∀ d q, peek d q = hd d (Abs q).
Axiom deq_relate : ∀ q, Abs (deq q) = tl (Abs q).
End QueueAbs.
Parameter V : Type.
Parameter queue : Type.
Parameter empty : queue.
Parameter is_empty : queue → bool.
Parameter enq : queue → V → queue.
Parameter deq : queue → queue.
Parameter peek : V → queue → V.
Parameter Abs : queue → list V.
Axiom empty_relate : Abs empty = [].
Axiom enq_relate : ∀ q v, Abs (enq q v) = (Abs q) ++ [v].
Axiom peek_relate : ∀ d q, peek d q = hd d (Abs q).
Axiom deq_relate : ∀ q, Abs (deq q) = tl (Abs q).
End QueueAbs.
Exercise: 3 stars, standard (two_list_queue)
Module TwoListQueueAbs <: QueueAbs.
Definition V := nat. (* for simplicity *)
Definition queue : Type := list V × list V.
(* (f, b) represents a queue with a front list f and a back list
b, where the back list is stored in reverse order. *)
Definition Abs '((f, b) : queue) : list V :=
f ++ (rev b).
Definition empty : queue :=
([], []).
Definition is_empty (q: queue) :=
match q with
| ([], []) ⇒ true
| _ ⇒ false
end.
Definition enq '((f, b) : queue) (v : V) :=
(f, v :: b).
Definition deq (q : queue) :=
match q with
| ([], []) ⇒ ([], [])
| ([], b) ⇒
match rev b with
| [] ⇒ ([], [])
| _ :: f ⇒ (f, [])
end
| (_ :: f, b) ⇒ (f, b)
end.
Definition peek (d : V) (q : queue) :=
match q with
| ([], []) ⇒ d
| ([], b) ⇒
match rev b with
| [] ⇒ d
| v :: _ ⇒ v
end
| (v :: _, _) ⇒ v
end.
Theorem empty_relate : Abs empty = [].
Proof.
(* FILL IN HERE *) Admitted.
Theorem enq_relate : ∀ q v,
Abs (enq q v) = (Abs q) ++ [v].
Proof.
(* FILL IN HERE *) Admitted.
Theorem peek_relate : ∀ d q,
peek d q = hd d (Abs q).
Proof.
(* FILL IN HERE *) Admitted.
Theorem deq_relate : ∀ q,
Abs (deq q) = tl (Abs q).
Proof.
(* FILL IN HERE *) Admitted.
End TwoListQueueAbs.
☐
Definition V := nat. (* for simplicity *)
Definition queue : Type := list V × list V.
(* (f, b) represents a queue with a front list f and a back list
b, where the back list is stored in reverse order. *)
Definition Abs '((f, b) : queue) : list V :=
f ++ (rev b).
Definition empty : queue :=
([], []).
Definition is_empty (q: queue) :=
match q with
| ([], []) ⇒ true
| _ ⇒ false
end.
Definition enq '((f, b) : queue) (v : V) :=
(f, v :: b).
Definition deq (q : queue) :=
match q with
| ([], []) ⇒ ([], [])
| ([], b) ⇒
match rev b with
| [] ⇒ ([], [])
| _ :: f ⇒ (f, [])
end
| (_ :: f, b) ⇒ (f, b)
end.
Definition peek (d : V) (q : queue) :=
match q with
| ([], []) ⇒ d
| ([], b) ⇒
match rev b with
| [] ⇒ d
| v :: _ ⇒ v
end
| (v :: _, _) ⇒ v
end.
Theorem empty_relate : Abs empty = [].
Proof.
(* FILL IN HERE *) Admitted.
Theorem enq_relate : ∀ q v,
Abs (enq q v) = (Abs q) ++ [v].
Proof.
(* FILL IN HERE *) Admitted.
Theorem peek_relate : ∀ d q,
peek d q = hd d (Abs q).
Proof.
(* FILL IN HERE *) Admitted.
Theorem deq_relate : ∀ q,
Abs (deq q) = tl (Abs q).
Proof.
(* FILL IN HERE *) Admitted.
End TwoListQueueAbs.
☐
Representation Invariants and Subset Types
{x : A | P} is the type of all values x of type A that satisfy property P, which itself has type A → Prop. The notation is deliberately suggestive of set-builder notation used in mathematics. Such types are known as subset types.
Example: The Even Naturals
But when we try to say that 2 is an even_nat, Coq rejects the
definition:
The problem is that 2 is a nat, but we haven't proved Nat.Even 2.
The proof is easy:
Now we can provide that proof to convince Coq two is an even_nat.
We can do that with function exist, which is suggestive of
"there exists an x : A such that P x."
Check exist : ∀ {A : Type} (P : A → Prop) (x : A), P x → {x : A | P x}.
Definition two : even_nat := exist Nat.Even 2 Even2.
Definition two : even_nat := exist Nat.Even 2 Even2.
Another way of constructing two is to enter Coq's proof scripting
mode and use tactics. We saw this briefly in ProofObjects.
That technique is often useful with subset types, because it
helps us more easily build the proof objects, rather than have to
write them ourselves.
A value of type even_nat is like a "package" containing the nat
and the proof that the nat is even. We have to use functions to
extract those components from the package.
Fail Example plus_two : 1 + two = 3.
Check proj1_sig : ∀ {A : Type} {P : A → Prop} (e : {x : A | P x}), A.
Example plus_two : 1 + proj1_sig two = 3.
Proof. reflexivity. Qed.
Check proj2_sig : ∀ {A : Type} {P : A → Prop} (e : {x : A | P x}), P (proj1_sig e).
Example Even2' : Nat.Even 2 := proj2_sig two.
Check proj1_sig : ∀ {A : Type} {P : A → Prop} (e : {x : A | P x}), A.
Example plus_two : 1 + proj1_sig two = 3.
Proof. reflexivity. Qed.
Check proj2_sig : ∀ {A : Type} {P : A → Prop} (e : {x : A | P x}), P (proj1_sig e).
Example Even2' : Nat.Even 2 := proj2_sig two.
Defining Subset Types
Subset types are just a syntactic notation for sig:
Inductive sig {A : Type} (P : A → Prop) : Type :=
| exist (x : A) : P x → sig P.
Notation "{ x : A | P }" := (sig A (fun x ⇒ P)).
| exist (x : A) : P x → sig P.
Notation "{ x : A | P }" := (sig A (fun x ⇒ P)).
The name sig is short for the Greek capital letter sigma,
because subset types are similar to something known in type
theory as sigma types, aka dependent sums.
Subset types and existential quantification are quite similar.
Recall how the latter is defined:
The only difference is that sig creates a Type whereas ex
creates a Prop. That is, the former is computational in content,
whereas the latter is logical. Therefore we can pattern match
to recover the witness from a sig, but we cannot do the same
with an ex.
Definition proj1_sig {A : Type} {P : A → Prop} (e : sig P) : A :=
match e with
| exist _ x _ ⇒ x
end.
Definition proj2_sig {A : Type} {P : A → Prop} (e : sig P) : P (proj1_sig e) :=
match e with
| exist _ _ p ⇒ p
end.
Fail Definition proj1_ex {A : Type} {P : A → Prop} (e : ex P) : A :=
match e with
| ex_intro _ x _ ⇒ x
end.
End SigSandbox.
match e with
| exist _ x _ ⇒ x
end.
Definition proj2_sig {A : Type} {P : A → Prop} (e : sig P) : P (proj1_sig e) :=
match e with
| exist _ _ p ⇒ p
end.
Fail Definition proj1_ex {A : Type} {P : A → Prop} (e : ex P) : A :=
match e with
| ex_intro _ x _ ⇒ x
end.
End SigSandbox.
Example: Vectors
The type itself enforces the representation invariant, because a
value of type vector X cannot be constructed without first
proving that the invariant holds.
Construct any vector of your choice.
Exercise: 1 star, standard (a_vector)
Exercise: 2 stars, standard (vector_cons_correct)
Definition vector_cons {X : Type} (x : X) (v : vector X) : vector X.
Proof.
(* FILL IN HERE *) Admitted.
Proof.
(* FILL IN HERE *) Admitted.
Prove the correctness of your cons operation.
Definition list_of_vector {X : Type} (v : vector X) : list X :=
fst (proj1_sig v).
Theorem vector_cons_correct : ∀ (X : Type) (x : X) (v : vector X),
list_of_vector (vector_cons x v) = x :: (list_of_vector v).
Proof.
(* FILL IN HERE *) Admitted.
☐
fst (proj1_sig v).
Theorem vector_cons_correct : ∀ (X : Type) (x : X) (v : vector X),
list_of_vector (vector_cons x v) = x :: (list_of_vector v).
Proof.
(* FILL IN HERE *) Admitted.
☐
Prove the correctness of your append operation.
Theorem vector_app_correct : ∀ (X : Type) (v1 v2 : vector X),
list_of_vector (vector_app v1 v2) =
list_of_vector v1 ++ list_of_vector v2.
Proof.
(* FILL IN HERE *) Admitted.
☐
list_of_vector (vector_app v1 v2) =
list_of_vector v1 ++ list_of_vector v2.
Proof.
(* FILL IN HERE *) Admitted.
☐
Using Subset Types to Enforce the BST Invariant
Note: no rep_ok anywhere.
Parameter bound : key → table → bool.
Parameter elements : table → list (key × V).
Axiom bound_empty : ∀ (k : key),
bound k empty = false.
Axiom bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Axiom bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Axiom elements_complete : ∀ (k : key) (v : V) (t : table),
bound k t = true →
get k t = v →
In (k, v) (elements t).
Axiom elements_correct : ∀ (k : key) (v : V) (t : table),
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
End ETableSubset.
Module TreeETableSubset (VT : ValType) <: ETableSubset.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
Parameter elements : table → list (key × V).
Axiom bound_empty : ∀ (k : key),
bound k empty = false.
Axiom bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Axiom bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Axiom elements_complete : ∀ (k : key) (v : V) (t : table),
bound k t = true →
get k t = v →
In (k, v) (elements t).
Axiom elements_correct : ∀ (k : key) (v : V) (t : table),
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
End ETableSubset.
Module TreeETableSubset (VT : ValType) <: ETableSubset.
Definition V := VT.V.
Definition default := VT.default.
Definition key := nat.
table now is required to enforce BST.
Now instead of proving separate theorems that operations return
valid representations, the proofs are "baked in" to the
operations.
Now we insert a projection to get to the tree.
Definition get (k : key) (t : table) : V :=
lookup default k (proj1_sig t).
Definition set (k : key) (v : V) (t : table) : table.
Proof.
destruct t as [t Ht].
apply (exist _ (insert k v t)).
apply insert_BST. assumption.
Defined.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k (proj1_sig t).
Definition elements (t : table) : list (key × V) :=
elements (proj1_sig t).
Theorem get_empty_default: ∀ (k : key),
get k empty = default.
Proof.
apply lookup_empty.
Qed.
lookup default k (proj1_sig t).
Definition set (k : key) (v : V) (t : table) : table.
Proof.
destruct t as [t Ht].
apply (exist _ (insert k v t)).
apply insert_BST. assumption.
Defined.
Definition bound (k : key) (t : table) : bool :=
SearchTree.bound k (proj1_sig t).
Definition elements (t : table) : list (key × V) :=
elements (proj1_sig t).
Theorem get_empty_default: ∀ (k : key),
get k empty = default.
Proof.
apply lookup_empty.
Qed.
Now the rest of the proofs require minor modifications to
destruct the table to get the tree and the representation
invariant, and use the latter where needed.
Theorem get_set_same: ∀ (k : key) (v : V) (t : table),
get k (set k v t) = v.
Proof.
intros. unfold get, set.
destruct t as [t Hbst]. simpl.
apply lookup_insert_eq.
Qed.
Theorem get_set_other: ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
Proof.
intros. unfold get, set.
destruct t as [t Hbst]. simpl.
apply lookup_insert_neq. assumption.
Qed.
Theorem bound_empty : ∀ (k : key),
bound k empty = false.
Proof.
reflexivity.
Qed.
Theorem bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Proof.
intros k v t. unfold bound, set.
destruct t as [t Hbst]. simpl in ×.
induction t; inv Hbst; bdall.
Qed.
Theorem bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Proof.
intros k k' v t Hneq. unfold bound, set.
destruct t as [t Hbst]. simpl in ×.
induction t; inv Hbst; bdall.
Qed.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup.
pose proof SearchTree.elements_complete as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete with default; try assumption.
Qed.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t. simpl. intros Hin.
pose proof SearchTree.elements_correct as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect; try assumption.
destruct t as [t Hbst]. assumption.
Qed.
End TreeETableSubset.
get k (set k v t) = v.
Proof.
intros. unfold get, set.
destruct t as [t Hbst]. simpl.
apply lookup_insert_eq.
Qed.
Theorem get_set_other: ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → get k' (set k v t) = get k' t.
Proof.
intros. unfold get, set.
destruct t as [t Hbst]. simpl.
apply lookup_insert_neq. assumption.
Qed.
Theorem bound_empty : ∀ (k : key),
bound k empty = false.
Proof.
reflexivity.
Qed.
Theorem bound_set_same : ∀ (k : key) (v : V) (t : table),
bound k (set k v t) = true.
Proof.
intros k v t. unfold bound, set.
destruct t as [t Hbst]. simpl in ×.
induction t; inv Hbst; bdall.
Qed.
Theorem bound_set_other : ∀ (k k' : key) (v : V) (t : table),
k ≠ k' → bound k' (set k v t) = bound k' t.
Proof.
intros k k' v t Hneq. unfold bound, set.
destruct t as [t Hbst]. simpl in ×.
induction t; inv Hbst; bdall.
Qed.
Theorem elements_complete : ∀ (k : key) (v : V) (t : table),
bound k t = true →
get k t = v →
In (k, v) (elements t).
Proof.
intros k v t Hbound Hlookup.
pose proof SearchTree.elements_complete as Hcomplete.
unfold elements_complete_spec in Hcomplete.
apply Hcomplete with default; try assumption.
Qed.
Theorem elements_correct : ∀ (k : key) (v : V) (t : table),
In (k, v) (elements t) →
bound k t = true ∧ get k t = v.
Proof.
intros k v t. simpl. intros Hin.
pose proof SearchTree.elements_correct as Hcorrect.
unfold elements_correct_spec in Hcorrect.
apply Hcorrect; try assumption.
destruct t as [t Hbst]. assumption.
Qed.
End TreeETableSubset.
Exercise: 4 stars, advanced (ListsETable)
(* Do not modify the following line: *)
Definition manual_grade_for_ListsETable : option (nat×string) := None.
☐
Definition manual_grade_for_ListsETable : option (nat×string) := None.
☐
(* 2024-11-04 20:41 *)