MergeMerge Sort, With Specification and Proof of Correctness
From VFA Require Import Perm.
From VFA Require Import Sort.
From Coq Require Import Recdef. (* needed for Function feature *)
From VFA Require Import Sort.
From Coq Require Import Recdef. (* needed for Function feature *)
Mergesort is a well-known sorting algorithm, normally presented
as an imperative algorithm on arrays, that has worst-case
O(n log n) execution time and requires O(n) auxiliary space.
The basic idea is simple: we divide the data to be sorted into two
halves, recursively sort each of them, and then
merge together the (sorted) results from each half:
mergesort xs =
split xs into ys,zs;
ys' = mergesort ys;
zs' = mergesort zs;
return (merge ys' zs')
(As usual, if you are unfamiliar with mergesort see Wikipedia or
your favorite algorithms textbook.)
Mergesort on lists works essentially the same way: we split the
original list into two halves, recursively sort each sublist,
and then merge the two sublists together again. The only
difference, compared to the imperative algorithm, is that splitting
the list takes O(n) rather than O(1) time; however, that
does not affect the asymptotic cost, since the merge step already
takes O(n) anyhow.
Let us try to write down the Gallina code for mergesort.
The first step is to write a splitting function. There are
several ways to do this, since the exact splitting method does
not matter as long as the results are (roughly) equal in size.
For example, if we know the length of the list, we could use that to split
at the half-way point. But here is an attractive alternative, which simply
alternates assigning the elements into left and right sublists:
mergesort xs =
split xs into ys,zs;
ys' = mergesort ys;
zs' = mergesort zs;
return (merge ys' zs')
Split and its properties
Fixpoint split {X:Type} (l:list X) : (list X × list X) :=
match l with
| [] ⇒ ([],[])
| [x] ⇒ ([x],[])
| x1::x2::l' ⇒
let (l1,l2) := split l' in
(x1::l1,x2::l2)
end.
match l with
| [] ⇒ ([],[])
| [x] ⇒ ([x],[])
| x1::x2::l' ⇒
let (l1,l2) := split l' in
(x1::l1,x2::l2)
end.
Note: For generality, we made this function polymorphic, since the
type of the values in the list is irrelevant to the splitting process.
While this function is straightforward to define, it can be a bit challenging
to work with. Let's try to prove the following lemma, which is obviously true:
Lemma split_len_first_try: ∀ {X} (l:list X) (l1 l2: list X),
split l = (l1,l2) →
length l1 ≤ length l ∧
length l2 ≤ length l.
Proof.
induction l; intros.
- inv H. simpl. lia.
- destruct l as [| x l'].
+ inv H.
split; simpl; auto.
+ inv H. destruct (split l') as [l1' l2'] eqn:E. inv H1.
(* We're stuck! The IH talks about split (x::l') but we
only know aobut split (a::x::l'). *)
Abort.
split l = (l1,l2) →
length l1 ≤ length l ∧
length l2 ≤ length l.
Proof.
induction l; intros.
- inv H. simpl. lia.
- destruct l as [| x l'].
+ inv H.
split; simpl; auto.
+ inv H. destruct (split l') as [l1' l2'] eqn:E. inv H1.
(* We're stuck! The IH talks about split (x::l') but we
only know aobut split (a::x::l'). *)
Abort.
The problem here is that the standard induction principle for lists
requires us to show that the property being proved follows for
any non-empty list if it holds for the tail of that list.
What we want here is a "two-step" induction principle, that instead requires
us to show that the property being proved follows for a list of
length at least two, if it holds for the tail of the tail of that list.
Formally:
Definition list_ind2_principle:=
∀ (A : Type) (P : list A → Prop),
P [] →
(∀ (a:A), P [a]) →
(∀ (a b : A) (l : list A), P l → P (a :: b :: l)) →
∀ l : list A, P l.
∀ (A : Type) (P : list A → Prop),
P [] →
(∀ (a:A), P [a]) →
(∀ (a b : A) (l : list A), P l → P (a :: b :: l)) →
∀ l : list A, P l.
If we assume the correctness of this "non-standard" induction principle,
our split_len proof is easy, using a form of the induction tactic
that lets us specify the induction principle to use:
Lemma split_len': list_ind2_principle →
∀ {X} (l:list X) (l1 l2: list X),
split l = (l1,l2) →
length l1 ≤ length l ∧
length l2 ≤ length l.
Proof.
unfold list_ind2_principle; intro IP.
induction l using IP; intros.
- inv H. lia.
- inv H. simpl; lia.
- inv H. destruct (split l) as [l1' l2']. inv H1.
simpl.
destruct (IHl l1' l2') as [P1 P2]; auto; lia.
Qed.
∀ {X} (l:list X) (l1 l2: list X),
split l = (l1,l2) →
length l1 ≤ length l ∧
length l2 ≤ length l.
Proof.
unfold list_ind2_principle; intro IP.
induction l using IP; intros.
- inv H. lia.
- inv H. simpl; lia.
- inv H. destruct (split l) as [l1' l2']. inv H1.
simpl.
destruct (IHl l1' l2') as [P1 P2]; auto; lia.
Qed.
We still need to prove list_ind2_principle. There are several
ways to do this, but one direct way is to write an explicit proof
term, thus:
Definition list_ind2 :
∀ (A : Type) (P : list A → Prop),
P [] →
(∀ (a:A), P [a]) →
(∀ (a b : A) (l : list A), P l → P (a :: b :: l)) →
∀ l : list A, P l :=
fun (A : Type)
(P : list A → Prop)
(H : P [])
(H0 : ∀ a : A, P [a])
(H1 : ∀ (a b : A) (l : list A), P l → P (a :: b :: l)) ⇒
fix IH (l : list A) : P l :=
match l with
| [] ⇒ H
| [x] ⇒ H0 x
| x::y::l' ⇒ H1 x y l' (IH l')
end.
∀ (A : Type) (P : list A → Prop),
P [] →
(∀ (a:A), P [a]) →
(∀ (a b : A) (l : list A), P l → P (a :: b :: l)) →
∀ l : list A, P l :=
fun (A : Type)
(P : list A → Prop)
(H : P [])
(H0 : ∀ a : A, P [a])
(H1 : ∀ (a b : A) (l : list A), P l → P (a :: b :: l)) ⇒
fix IH (l : list A) : P l :=
match l with
| [] ⇒ H
| [x] ⇒ H0 x
| x::y::l' ⇒ H1 x y l' (IH l')
end.
Here, the fix keyword defines a local recursive function IH
of type ∀ l:list A, P l, which is returned as the overall value of
list_ind2. As usual, this function must be obviously terminating
to Coq (which it is because the recursive call is on a sublist l'
of the original argument l) and the match must be exhaustive over
all possible lists (which it evidently is).
With our induction principle in hand, we can finally prove
split_len free and clear:
Lemma split_len: ∀ {X} (l:list X) (l1 l2: list X),
split l = (l1,l2) →
length l1 ≤ length l ∧
length l2 ≤ length l.
Proof.
apply (@split_len' list_ind2).
Qed.
split l = (l1,l2) →
length l1 ≤ length l ∧
length l2 ≤ length l.
Proof.
apply (@split_len' list_ind2).
Qed.
Exercise: 3 stars, standard (split_perm)
Lemma split_perm : ∀ {X:Type} (l l1 l2: list X),
split l = (l1,l2) → Permutation l (l1 ++ l2).
Proof.
induction l as [| x | x1 x2 l1' IHl'] using list_ind2; intros.
(* FILL IN HERE *) Admitted.
☐
split l = (l1,l2) → Permutation l (l1 ++ l2).
Proof.
induction l as [| x | x1 x2 l1' IHl'] using list_ind2; intros.
(* FILL IN HERE *) Admitted.
☐
Defining Merge
Fixpoint merge l1 l2 :=
match l1, l2 with
| [], _ ⇒ l2
| _, [] ⇒ l1
| a1::l1', a2::l2' ⇒
if a1 <=? a2 then a1 :: merge l1' l2 else a2 :: merge l1 l2'
end.
Error: Cannot guess decreasing argument of fix.
Fixpoint merge l1 l2 {struct l1} :=
let fix merge_aux l2 :=
match l1, l2 with
| [], _ ⇒ l2
| _, [] ⇒ l1
| a1::l1', a2::l2' ⇒
if a1 <=? a2 then a1 :: merge l1' l2 else a2 :: merge_aux l2'
end
in merge_aux l2.
let fix merge_aux l2 :=
match l1, l2 with
| [], _ ⇒ l2
| _, [] ⇒ l1
| a1::l1', a2::l2' ⇒
if a1 <=? a2 then a1 :: merge l1' l2 else a2 :: merge_aux l2'
end
in merge_aux l2.
Coq accepts the outer definition because it is structurally
decreasing on l1 (we specify that with the {struct l1} annotation,
although Coq would have guessed this even if we didn't write it),
and it accepts the inner definition because it is structurally recursive
on its (sole) argument. (Note that let fix ... in ... end is just a
mechanism for defining a local recursive function.)
This definition will turn out to work pretty well; the only irritation
is that simplification will show the definition of merge_aux, as
illustrated by the following examples.
First, let's remind ourselves that Coq desugars a match over multiple
arguments into a nested sequence of matches:
Print merge.
==> (after a little renaming for clarity)
fix merge (l1 l2 : list nat) {struct l1} : list nat :=
let
fix merge_aux (l2 : list nat) : list nat :=
match l1 with
| [] ⇒ l2
| a1 :: l1' ⇒
match l2 with
| [] ⇒ l1
| a2 :: l2' ⇒
if a1 <=? a2 then a1 :: merge l1' l2 else a2 :: merge_aux l2'
end
end in
merge_aux l2.
Let's prove the following simple lemmas about merge:
fix merge (l1 l2 : list nat) {struct l1} : list nat :=
let
fix merge_aux (l2 : list nat) : list nat :=
match l1 with
| [] ⇒ l2
| a1 :: l1' ⇒
match l2 with
| [] ⇒ l1
| a2 :: l2' ⇒
if a1 <=? a2 then a1 :: merge l1' l2 else a2 :: merge_aux l2'
end
end in
merge_aux l2.
Lemma merge2 : ∀ (x1 x2:nat) r1 r2,
x1 ≤ x2 →
merge (x1::r1) (x2::r2) =
x1::merge r1 (x2::r2).
Proof.
intros.
simpl. (* This blows up in an unpleasant way, but we can
still make some sense of it. Look at the
(fix merge_aux ...) term. It represents the
the local function merge_aux after the value of the
free variable l1 has been substituted by x1::r1,
the match over l1 has been simplified to its
second arm (the non-empty case) and x1 and r1 have
been substituted for the pattern variables a1 and l1'.
The entire fix is applied to r2, but Coq won't attempt
any further simplification until the structure of r2
is known. *)
bdestruct (x1 <=? x2).
- auto.
- (* Since H and H0 are contradictory, this case follows by lia.
But (ignoring that for the moment), note that we can get further
simplification to occur if we give some structure to l2: *)
simpl. (* does nothing *)
destruct r2; simpl. (* makes some progress *)
+ lia.
+ lia.
Qed.
Lemma merge_nil_l : ∀ l, merge [] l = l.
Proof.
intros. simpl.
(* Once again, we see a version of merge_aux specialized to
the value l1 = nil. Now we see only the first arm (the
empty case) of the match expression, which simply returns l2;
in other words, here the fix is just the identity function.
And once again, the fix is applied to l. Irritatingly,
Coq _still_ refuses to perform the application unless l
is destructured first (even though the answer is always l). *)
destruct l.
- auto.
- auto.
Qed.
x1 ≤ x2 →
merge (x1::r1) (x2::r2) =
x1::merge r1 (x2::r2).
Proof.
intros.
simpl. (* This blows up in an unpleasant way, but we can
still make some sense of it. Look at the
(fix merge_aux ...) term. It represents the
the local function merge_aux after the value of the
free variable l1 has been substituted by x1::r1,
the match over l1 has been simplified to its
second arm (the non-empty case) and x1 and r1 have
been substituted for the pattern variables a1 and l1'.
The entire fix is applied to r2, but Coq won't attempt
any further simplification until the structure of r2
is known. *)
bdestruct (x1 <=? x2).
- auto.
- (* Since H and H0 are contradictory, this case follows by lia.
But (ignoring that for the moment), note that we can get further
simplification to occur if we give some structure to l2: *)
simpl. (* does nothing *)
destruct r2; simpl. (* makes some progress *)
+ lia.
+ lia.
Qed.
Lemma merge_nil_l : ∀ l, merge [] l = l.
Proof.
intros. simpl.
(* Once again, we see a version of merge_aux specialized to
the value l1 = nil. Now we see only the first arm (the
empty case) of the match expression, which simply returns l2;
in other words, here the fix is just the identity function.
And once again, the fix is applied to l. Irritatingly,
Coq _still_ refuses to perform the application unless l
is destructured first (even though the answer is always l). *)
destruct l.
- auto.
- auto.
Qed.
Morals:
(1) Even though the proof state involving local recursive
functions can can be hard to read, persevere!
(2) If Coq won't simplify an "obvious" application, try destructing
the argument.
We will defer stating and proving other properties of merge until later.
Finally, we need to define the main mergesort function itself.
Once again, we might hope to write something simple like this:
Fixpoint mergesort (l: list nat) : list nat :=
let (l1,l2) := split l in
merge (mergesort l1) (mergesort l2).
Since this function has only one argument, Coq guesses that it is
intended to be structurally decreasing, but still
rejects the definition, this time with the complaint:
Recursive call to mergesort has principal argument equal to
"l1" instead of a subterm of "l".
Again, the problem is that Coq has no way to know that l1 and l2
are "smaller" than l. And this time, it is hard to complain that
Coq is being stupid, since the fact that split returns smaller
lists than it is passed is nontrivial.
In fact, it isn't true! Consider the behavior of split on
empty or singleton lists... This is case where Coq's totality
requirements can actually help us correct the definition of
our code. What we really want to write is something more like:
Fixpoint mergesort (l: list nat) : list nat :=
match l with
| [] ⇒ []
| [x] ⇒ [x]
| _ ⇒ let (l1,l2) := split l in merge (mergesort l1) (mergesort l2).
Now this function really is terminating! But Coq still won't let us
write it with a Fixpoint. Instead, we need to use a mechanism
(there are several available) for defining functions that accommodates
an explicit way to show that the function only calls itself on smaller
arguments. We will use the Function command:
Defining Mergesort
Fixpoint mergesort (l: list nat) : list nat :=
let (l1,l2) := split l in
merge (mergesort l1) (mergesort l2).
Recursive call to mergesort has principal argument equal to
"l1" instead of a subterm of "l".
Fixpoint mergesort (l: list nat) : list nat :=
match l with
| [] ⇒ []
| [x] ⇒ [x]
| _ ⇒ let (l1,l2) := split l in merge (mergesort l1) (mergesort l2).
Function mergesort (l: list nat) {measure length l} : list nat :=
match l with
| [] ⇒ []
| [x] ⇒ [x]
| _ ⇒ let (l1,l2) := split l in
merge (mergesort l1) (mergesort l2)
end.
match l with
| [] ⇒ []
| [x] ⇒ [x]
| _ ⇒ let (l1,l2) := split l in
merge (mergesort l1) (mergesort l2)
end.
Function is similar to Fixpoint, but it lets us specify
an explicit measure on the function arguments.
The annotation {measure length l} says that the function
length applied to argument l serves as a decreasing measure.
After processing this definition, Coq enters proof mode and demands
proofs that each recursive call is indeed on a shorter list.
Happily, we proved that fact already.
Proof.
- (* recursive call on l1 *)
intros.
simpl in ×. destruct (split l1) as [l1' l2'] eqn:E. inv teq1. simpl.
destruct (split_len _ _ _ E).
lia.
- (* recursive call on l2 *)
intros.
simpl in ×. destruct (split l1) as [l1' l2'] eqn:E. inv teq1. simpl.
destruct (split_len _ _ _ E).
lia.
Defined.
- (* recursive call on l1 *)
intros.
simpl in ×. destruct (split l1) as [l1' l2'] eqn:E. inv teq1. simpl.
destruct (split_len _ _ _ E).
lia.
- (* recursive call on l2 *)
intros.
simpl in ×. destruct (split l1) as [l1' l2'] eqn:E. inv teq1. simpl.
destruct (split_len _ _ _ E).
lia.
Defined.
Notice that the Proof must end with the keyword Defined rather
than Qed; if we don't do this, we won't be able to actually
compute with mergesort.
Defining mergesort with Function rather than Fixpoint causes
the automatic generation of some useful auxiliary definitions that we
will need when working with it.
First, we get a lemma mergesort_equation, which performs a one-level
unfolding of the function.
==>
mergesort_equation
: ∀ l : list nat,
mergesort l =
match l with
| [] ⇒ []
| [x] ⇒ [x]
| x :: _ :: _ ⇒
let (l2, l3) := split l in merge (mergesort l2) (mergesort l3)
end
We should always use apply mergesort_equation
to simplify a call to mergesort rather than trying to unfold or simpl
it, which will lead to ugly or mysterious results.
Second, we get an induction principle mergesort_ind; performing
induction using this principle can be much easier than trying to
use list induction over the argument l.
mergesort_equation
: ∀ l : list nat,
mergesort l =
match l with
| [] ⇒ []
| [x] ⇒ [x]
| x :: _ :: _ ⇒
let (l2, l3) := split l in merge (mergesort l2) (mergesort l3)
end
==>
mergesort_ind
: ∀ P : list nat → list nat → Prop,
(∀ l : list nat, l = [] → P [] []) →
(∀ (l : list nat) (x : nat), l = [x] → P [x] [x]) →
(∀ l _x : list nat,
l = _x →
match _x with
| _ :: _ :: _ ⇒ True
| _ ⇒ False
end →
∀ l1 l2 : list nat,
split l = (l1, l2) →
P l1 (mergesort l1) →
P l2 (mergesort l2) → P _x (merge (mergesort l1) (mergesort l2))) →
∀ l : list nat, P l (mergesort l)
As with insertion sort, our goal is to prove that mergesort produces
a sorted list that is a permutation of the original list, i.e. to prove
is_a_sorting_algorithm mergesort
We will start by showing that mergesort produces a sorted list. The key
lemma is to show that merge of two sorted lists produces a sorted list.
It is perhaps easiest to break out a sub-lemma first:
mergesort_ind
: ∀ P : list nat → list nat → Prop,
(∀ l : list nat, l = [] → P [] []) →
(∀ (l : list nat) (x : nat), l = [x] → P [x] [x]) →
(∀ l _x : list nat,
l = _x →
match _x with
| _ :: _ :: _ ⇒ True
| _ ⇒ False
end →
∀ l1 l2 : list nat,
split l = (l1, l2) →
P l1 (mergesort l1) →
P l2 (mergesort l2) → P _x (merge (mergesort l1) (mergesort l2))) →
∀ l : list nat, P l (mergesort l)
Correctness: Sortedness
is_a_sorting_algorithm mergesort
Exercise: 2 stars, standard (sorted_merge1)
Lemma sorted_merge1 : ∀ x x1 l1 x2 l2,
x ≤ x1 → x ≤ x2 →
sorted (merge (x1::l1) (x2::l2)) →
sorted (x :: merge (x1::l1) (x2::l2)).
Proof.
(* FILL IN HERE *) Admitted.
☐
x ≤ x1 → x ≤ x2 →
sorted (merge (x1::l1) (x2::l2)) →
sorted (x :: merge (x1::l1) (x2::l2)).
Proof.
(* FILL IN HERE *) Admitted.
☐
Lemma sorted_merge : ∀ l1, sorted l1 →
∀ l2, sorted l2 →
sorted (merge l1 l2).
Proof.
(* Hint: This is one unusual case where it is _much_ easier to do induction on
l1 rather than on sorted l1. You will also need to do
nested inductions on l2. *)
(* FILL IN HERE *) Admitted.
☐
∀ l2, sorted l2 →
sorted (merge l1 l2).
Proof.
(* Hint: This is one unusual case where it is _much_ easier to do induction on
l1 rather than on sorted l1. You will also need to do
nested inductions on l2. *)
(* FILL IN HERE *) Admitted.
☐
Lemma mergesort_sorts: ∀ l, sorted (mergesort l).
Proof.
apply mergesort_ind; intros. (* Note that we use the special induction principle. *)
(* FILL IN HERE *) Admitted.
☐
Proof.
apply mergesort_ind; intros. (* Note that we use the special induction principle. *)
(* FILL IN HERE *) Admitted.
☐
Correctness: Permutation
Exercise: 3 stars, advanced (merge_perm)
Lemma merge_perm: ∀ (l1 l2: list nat),
Permutation (l1 ++ l2) (merge l1 l2).
Proof.
(* Hint: A nested induction on l2 is required. *)
(* FILL IN HERE *) Admitted.
☐
Permutation (l1 ++ l2) (merge l1 l2).
Proof.
(* Hint: A nested induction on l2 is required. *)
(* FILL IN HERE *) Admitted.
☐
Theorem mergesort_correct:
is_a_sorting_algorithm mergesort.
Proof.
split.
apply mergesort_perm.
apply mergesort_sorts.
Qed.
is_a_sorting_algorithm mergesort.
Proof.
split.
apply mergesort_perm.
apply mergesort_sorts.
Qed.
(* 2024-08-08 11:38 *)