module Assignment3 where

YOUR NAME AND EMAIL GOES HERE

Introduction

You must do all the exercises labelled “(recommended)”.

Exercises labelled “(stretch)” are there to provide an extra challenge. You don’t need to do all of these, but should attempt at least a few.

Exercises labelled “(practice)” are included for those who want extra practice.

Submit your homework using Gradescope. Go to the course page under Learn. Select “Assessment”, then select “Assignment Submission”. Please ensure your files execute correctly under Agda!

Good Scholarly Practice.

Please remember the University requirement as regards all assessed work. Details about this can be found at:

https://web.inf.ed.ac.uk/infweb/admin/policies/academic-misconduct

Furthermore, you are required to take reasonable measures to protect your assessed work from unauthorised access. For example, if you put any such work on a public repository then you must set access permissions appropriately (generally permitting access only to yourself, or your group in the case of group practicals).

Lists

module Lists where

Imports

  import Relation.Binary.PropositionalEquality as Eq
  open Eq using (_≡_; refl; sym; trans; cong)
  open Eq.≡-Reasoning
  open import Data.Bool using (Bool; true; false; T; _∧_; _∨_; not)
  open import Data.Nat using (; zero; suc; _+_; _*_; _∸_; _≤_; s≤s; z≤n)
  open import Data.Nat.Properties using
    (+-assoc; +-identityˡ; +-identityʳ; *-assoc; *-identityˡ; *-identityʳ; *-distribʳ-+)
  open import Relation.Nullary using (¬_; Dec; yes; no)
  open import Data.Product using (_×_; ; ∃-syntax) renaming (_,_ to ⟨_,_⟩)
  open import Function using (_∘_)
  open import Level using (Level)
  open import plfa.part1.Isomorphism using (_≃_; _⇔_)
  open import plfa.part1.Lists
    hiding (downFrom; Tree; leaf; node; merge)

Show that the reverse of one list appended to another is the reverse of the second appended to the reverse of the first:

reverse (xs ++ ys) ≡ reverse ys ++ reverse xs

A function is an involution if when applied twice it acts as the identity function. Show that reverse is an involution:

reverse (reverse xs) ≡ xs

Exercise map-compose (practice)

Prove that the map of a composition is equal to the composition of two maps:

map (g ∘ f) ≡ map g ∘ map f

The last step of the proof requires extensionality.

  -- Your code goes here

Exercise map-++-distribute (practice)

Prove the following relationship between map and append:

map f (xs ++ ys) ≡ map f xs ++ map f ys
  -- Your code goes here

Exercise map-Tree (practice)

Define a type of trees with leaves of type A and internal nodes of type B:
  data Tree (A B : Set) : Set where
    leaf : A  Tree A B
    node : Tree A B  B  Tree A B  Tree A B

Define a suitable map operator over trees:

map-Tree : ∀ {A B C D : Set} → (A → C) → (B → D) → Tree A B → Tree C D
  -- Your code goes here

Use fold to define a function to find the product of a list of numbers. For example:

product [ 1 , 2 , 3 , 4 ] ≡ 24
  -- Your code goes here

Show that fold and append are related as follows:

foldr _⊗_ e (xs ++ ys) ≡ foldr _⊗_ (foldr _⊗_ e ys) xs
  -- Your code goes here

Exercise foldr-∷ (practice)

Show

foldr _∷_ [] xs ≡ xs

Show as a consequence of foldr-++ above that

xs ++ ys ≡ foldr _∷_ ys xs
  -- Your code goes here

Exercise map-is-foldr (practice)

Show that map can be defined using fold:

map f ≡ foldr (λ x xs → f x ∷ xs) []

The proof requires extensionality.

  -- Your code goes here

Exercise fold-Tree (practice)

Define a suitable fold function for the type of trees given earlier:

fold-Tree : ∀ {A B C : Set} → (A → C) → (C → B → C → C) → Tree A B → C
  -- Your code goes here

Exercise map-is-fold-Tree (practice)

Demonstrate an analogue of map-is-foldr for the type of trees.

  -- Your code goes here

Exercise sum-downFrom (practice) (was stretch)

Define a function that counts down as follows:
  downFrom :   List 
  downFrom zero     =  []
  downFrom (suc n)  =  n  downFrom n
For example:
  _ : downFrom 3  [ 2 , 1 , 0 ]
  _ = refl

Prove that the sum of the numbers (n - 1) + ⋯ + 0 is equal to n * (n ∸ 1) / 2:

sum (downFrom n) * 2 ≡ n * (n ∸ 1)
  -- Your code goes here

Exercise foldl (practice)

Define a function foldl which is analogous to foldr, but where operations associate to the left rather than the right. For example:

foldr _⊗_ e [ x , y , z ]  =  x ⊗ (y ⊗ (z ⊗ e))
foldl _⊗_ e [ x , y , z ]  =  ((e ⊗ x) ⊗ y) ⊗ z
  -- Your code goes here

Exercise foldr-monoid-foldl (practice)

Show that if _⊗_ and e form a monoid, then foldr _⊗_ e and foldl _⊗_ e always compute the same result.

  -- Your code goes here

Prove a result similar to All-++-⇔, but with Any in place of All, and a suitable replacement for _×_. As a consequence, demonstrate an equivalence relating _∈_ and _++_.

  -- Your code goes here

Exercise All-++-≃ (practice) (was stretch)

Show that the equivalence All-++-⇔ can be extended to an isomorphism.

  -- Your code goes here

Show that Any and All satisfy a version of De Morgan’s Law:

(¬_ ∘ Any P) xs ⇔ All (¬_ ∘ P) xs

(Can you see why it is important that here _∘_ is generalised to arbitrary levels, as described in the section on universe polymorphism?)

Do we also have the following?

(¬_ ∘ All P) xs ⇔ Any (¬_ ∘ P) xs

If so, prove; if not, explain why.

  -- Your code goes here

Exercise ¬Any≃All¬ (practice) (was stretch)

Show that the equivalence ¬Any⇔All¬ can be extended to an isomorphism. You will need to use extensionality.

  -- Your code goes here

Exercise All-∀ (practice)

Show that All P xs is isomorphic to ∀ x → x ∈ xs → P x.

  -- You code goes here

Exercise Any-∃ (practice)

Show that Any P xs is isomorphic to ∃[ x ] (x ∈ xs × P x).

  -- You code goes here

Exercise Any? (practice) (was stretch)

Just as All has analogues all and All? which determine whether a predicate holds for every element of a list, so does Any have analogues any and Any? which determine whether a predicate holds for some element of a list. Give their definitions.

  -- Your code goes here

Exercise split (practice) (was stretch)

The relation merge holds when two lists merge to give a third list.
  data merge {A : Set} : (xs ys zs : List A)  Set where

    [] :
        --------------
        merge [] [] []

    left-∷ :  {x xs ys zs}
       merge xs ys zs
        --------------------------
       merge (x  xs) ys (x  zs)

    right-∷ :  {y xs ys zs}
       merge xs ys zs
        --------------------------
       merge xs (y  ys) (y  zs)
For example,
  _ : merge [ 1 , 4 ] [ 2 , 3 ] [ 1 , 2 , 3 , 4 ]
  _ = left-∷ (right-∷ (right-∷ (left-∷ [])))

Given a decidable predicate and a list, we can split the list into two lists that merge to give the original list, where all elements of one list satisfy the predicate, and all elements of the other do not satisfy the predicate.

Define the following variant of the traditional filter function on lists, which given a decidable predicate and a list returns a list of elements that satisfy the predicate and a list of elements that don’t, with their corresponding proofs.

split : ∀ {A : Set} {P : A → Set} (P? : Decidable P) (zs : List A)
  → ∃[ xs ] ∃[ ys ] ( merge xs ys zs × All P xs × All (¬_ ∘ P) ys )
  -- Your code goes here

Lambda

module Lambda where

Imports

  open import Data.Bool using (Bool; true; false; T; not)
  open import Data.Empty using (; ⊥-elim)
  open import Data.List using (List; _∷_; [])
  open import Data.Nat using (; zero; suc)
  open import Data.Product using (∃-syntax; _×_)
  open import Data.String using (String; _≟_)
  open import Data.Unit using (tt)
  open import Relation.Nullary using (Dec; yes; no; ¬_)
  open import Relation.Nullary.Decidable using (False; toWitnessFalse)
  open import Relation.Nullary.Negation using (¬?)
  open import Relation.Binary.PropositionalEquality using (_≡_; _≢_; refl)
  open import plfa.part2.Lambda
    hiding (var?; ƛ′_⇒_; case′_[zero⇒_|suc_⇒_]; μ′_⇒_; plus′)

Write out the definition of a lambda term that multiplies two natural numbers. Your definition may use plus as defined earlier.

  -- Your code goes here

Exercise mulᶜ (practice)

Write out the definition of a lambda term that multiplies two natural numbers represented as Church numerals. Your definition may use plusᶜ as defined earlier (or may not — there are nice definitions both ways).

  -- Your code goes here

Exercise primed (stretch)

Some people find it annoying to write ` "x" instead of x. We can make examples with lambda terms slightly easier to write by adding the following definitions:
  var? : (t : Term)  Bool
  var? (` _)  =  true
  var? _      =  false

  ƛ′_⇒_ : (t : Term)  {_ : T (var? t)}  Term  Term
  ƛ′_⇒_ (` x) N = ƛ x  N

  case′_[zero⇒_|suc_⇒_] : Term  Term  (t : Term)  {_ : T (var? t)}  Term  Term
  case′ L [zero⇒ M |suc (` x)  N ]  =  case L [zero⇒ M |suc x  N ]

  μ′_⇒_ : (t : Term)  {_ : T (var? t)}  Term  Term
  μ′ (` x)  N  =  μ x  N

Recall that T is a function that maps from the computation world to the evidence world, as defined in Chapter Decidable. We ensure to use the primed functions only when the respective term argument is a variable, which we do by providing implicit evidence. For example, if we tried to define an abstraction term that binds anything but a variable:

_ : Term
_ = ƛ′ two ⇒ two

Agda would complain it cannot find a value of the bottom type for the implicit argument. Note the implicit argument’s type reduces to when term t is anything but a variable.

The definition of plus can now be written as follows:
  plus′ : Term
  plus′ = μ′ +  ƛ′ m  ƛ′ n 
            case′ m
              [zero⇒ n
              |suc m  `suc (+ · m · n) ]
    where
    +  =  ` "+"
    m  =  ` "m"
    n  =  ` "n"

Write out the definition of multiplication in the same style.

Exercise _[_:=_]′ (stretch)

The definition of substitution above has three clauses (ƛ, case, and μ) that invoke a with clause to deal with bound variables. Rewrite the definition to factor the common part of these three clauses into a single function, defined by mutual recursion with substitution.

  -- Your code goes here

Exercise —↠≲—↠′ (practice)

Show that the first notion of reflexive and transitive closure above embeds into the second. Why are they not isomorphic?

  -- Your code goes here

Exercise plus-example (practice)

Write out the reduction sequence demonstrating that one plus one is two.

  -- Your code goes here

Exercise Context-≃ (practice)

Show that Context is isomorphic to List (Id × Type). For instance, the isomorphism relates the context

∅ , "s" ⦂ `ℕ ⇒ `ℕ , "z" ⦂ `ℕ

to the list

[ ⟨ "z" , `ℕ ⟩ , ⟨ "s" , `ℕ ⇒ `ℕ ⟩ ]
  -- Your code goes here

Using the term mul you defined earlier, write out the derivation showing that it is well typed.

  -- Your code goes here

Exercise ⊢mulᶜ (practice)

Using the term mulᶜ you defined earlier, write out the derivation showing that it is well typed.

  -- Your code goes here

Properties

module Properties where

Imports

  open import Relation.Binary.PropositionalEquality
    using (_≡_; _≢_; refl; sym; cong; cong₂)
  open import Data.String using (String; _≟_)
  open import Data.Nat using (; zero; suc)
  open import Data.Empty using (; ⊥-elim)
  open import Data.Product
    using (_×_; proj₁; proj₂; ; ∃-syntax)
    renaming (_,_ to ⟨_,_⟩)
  open import Data.Sum using (_⊎_; inj₁; inj₂)
  open import Relation.Nullary using (¬_; Dec; yes; no)
  open import Function using (_∘_)
  open import plfa.part1.Isomorphism
  open import plfa.part2.Lambda
  open import plfa.part2.Properties
    hiding (value?; Canonical_⦂_; unstuck; preserves; wttdgs)
  -- open Lambda using (mul; ⊢mul)

Exercise Canonical-≃ (practice)

Well-typed values must take one of a small number of canonical forms, which provide an analogue of the Value relation that relates values to their types. A lambda expression must have a function type, and a zero or successor expression must be a natural. Further, the body of a function must be well typed in a context containing only its bound variable, and the argument of successor must itself be canonical:
  infix  4 Canonical_⦂_

  data Canonical_⦂_ : Term  Type  Set where

    C-ƛ :  {x A N B}
        , x  A  N  B
        -----------------------------
       Canonical (ƛ x  N)  (A  B)

    C-zero :
        --------------------
        Canonical `zero  `ℕ

    C-suc :  {V}
       Canonical V  `ℕ
        ---------------------
       Canonical `suc V  `ℕ

Show that Canonical V ⦂ A is isomorphic to (∅ ⊢ V ⦂ A) × (Value V), that is, the canonical forms are exactly the well-typed values.

  -- Your code goes here

Exercise Progress-≃ (practice)

Show that Progress M is isomorphic to Value M ⊎ ∃[ N ](M —→ N).

  -- Your code goes here

Exercise progress′ (practice)

Write out the proof of progress′ in full, and compare it to the proof of progress above.

  -- Your code goes here

Exercise value? (practice)

Combine progress and —→¬V to write a program that decides whether a well-typed term is a value:
  postulate
    value? :  {A M}    M  A  Dec (Value M)

Exercise subst′ (stretch)

Rewrite subst to work with the modified definition _[_:=_]′ from the exercise in the previous chapter. As before, this should factor dealing with bound variables into a single function, defined by mutual recursion with the proof that substitution preserves types.

  -- Your code goes here

Using the evaluator, confirm that two times two is four.

  -- Your code goes here

Exercise: progress-preservation (practice)

Without peeking at their statements above, write down the progress and preservation theorems for the simply typed lambda-calculus.

  -- Your code goes here

Exercise subject_expansion (practice)

We say that M reduces to N if M —→ N, but we can also describe the same situation by saying that N expands to M. The preservation property is sometimes called subject reduction. Its opposite is subject expansion, which holds if M —→ N and ∅ ⊢ N ⦂ A imply ∅ ⊢ M ⦂ A. Find two counter-examples to subject expansion, one with case expressions and one not involving case expressions.

  -- Your code goes here

Exercise stuck (practice)

Give an example of an ill-typed term that does get stuck.

  -- Your code goes here

Provide proofs of the three postulates, unstuck, preserves, and wttdgs above.

  -- Your code goes here

DeBruijn

module DeBruijn where

Imports

  import Relation.Binary.PropositionalEquality as Eq
  open Eq using (_≡_; refl)
  open import Data.Empty using (; ⊥-elim)
  open import Data.Nat using (; zero; suc; _<_; _≤?_; z≤n; s≤s)
  open import Relation.Nullary using (¬_)
  open import Relation.Nullary.Decidable using (True; toWitness)
  open import plfa.part2.DeBruijn
    hiding ()

Write out the definition of a lambda term that multiplies two natural numbers, now adapted to the intrinsically-typed de Bruijn representation.

  -- Your code goes here

Exercise V¬—→ (practice)

Following the previous development, show values do not reduce, and its corollary, terms that reduce are not values.

  -- Your code goes here

Using the evaluator, confirm that two times two is four.

  -- Your code goes here