# Tagged Questions

Type theory is closely related to (and in some cases overlaps with) type systems in programming languages. In type theory, every "term" has a "type" and operations are restricted to terms of a certain type.

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### What are “vocabulary types”, and how many exist?

Across programming languages, I've encountered similar composite types with different names: Optional / Maybe Any Variant / Sum Record / Product People often use the term vocabulary type, yet I'...
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### Describing a typeclass for general graphs in Haskell

I'm trying to write a typeclass for graphs. Basically, the typeclass looks like: class Graph g where adjacentNodes :: g n -> n -> [n] in which I use n to represent the type of nodes. Then ...
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### F-bounded existential quantification

I came across the existential quantification for F-bounded types while trying to understand scala's type system. Let A be a type trait A[F <: A[F]] { self: F => } where F is the F-bounded ...
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As part of doing a survey on various dependently typed formalization techniques, I have ran across a paper advocating the use of singleton types (types with one inhabitant) as a way of supporting ...
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### Representing a fixpoint in a head-normal lambda calculus AST

Consider the following normalized term representation, obtained during type checking: data Normal a = Neutral (Neutral a) | Type | Pi (Normal a) (Normal (Maybe a)) | Abstract (Normal (Maybe a)...
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### Find Minimal Type

The following two types are equivalent: unit -> ([record(fn: unit -> fix)] as fix) (A) [unit -> record(fn: fix)] as fix (B) however neither can be obtained from the ...
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I'm taking a course on programming languages and the answer to "when is a function a sub type of another function" is very counter-intuitive to me. To clarify: suppose that we have the following type ...
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### One type vs. multiple types

I'll speak a little abstractly to make the problem statement brief and succinct. For all purposes, let's assume .NET/C# as the underlying technology/language. Let's say you're writing a software ...
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### Is it possible to define a recursive type in Common Lisp?

A recursive type is a type which has a base and a recursive case of itself. I wanted this to implement "typed lists", i.e., lists whose conses only allow the same element type or nil. I tried the ...
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### What is a practical example of using a TopType?

after reading the following two links the question arises: What is a practical example of using a TopType? https://en.wikipedia.org/wiki/Top_type http://www.c2.com/cgi/wiki?TopType
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### What is the canonical name for the identity type?

I recently answered a question here: How do I express this in Typescript? Here's the snippet of code from the above: trait FooBar[M[_]] { val foo: M[Integer] val bar: M[String] } type Identity[...
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### Law of excluded middle in Agda

I've heard the claim that Agda's Martin-Lof Type Theory with Excluded Middle is consistent. How would I go about adding it as a postulate? Also, after Adding LEM, is it then classical first-order ...
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### Types are erased before run time

I know for sure that in Haskell types are always erased before run-time. What happen in case of Agda? Is dependent type information carried through to run-time ?
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### Is this a meaningful generalization of `scan`s for arbitrary ADTs?

I've been thinking how one could generalize scanl to arbitrary ADTs. The Prelude approach is just to treat everything as a list (i.e., Foldable) and apply the scanl on the flatened view of the ...
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### Java: Why must user satisfy extends constraint?

Consider this code: public class Enclosing { class A<X extends Y, Y> {} <U, V> void foo(A<U,V> a) {} } This gives me an error: Type parameter U is not within its ...
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### How to prove that the defining equations of the recursor for N hold propositionally using the induction principle for N in Agda?

This is an exercise from the Homotopy Type Theory book. Here's what I have: data ℕ : Set where zero : ℕ succ : ℕ → ℕ iter : {C : Set} → C → (C → C) → ℕ → C iter z f zero = z iter z f (...
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### Why can't I define `Eq` using only indices in Agda?

Why can't I define a more explicit version of heterogenous equality like this: data Eq : (A : Set) -> A -> A -> Set where Refl : (T : Set) -> (x : T) -> Eq T x x When I do so, I ...
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### The world is not enough

I'm still trying to embed Observational Type Theory in itself and the whole thing into Agda. Currently I have the following hierarchy of universes: Prop : Type 0 : Type 1 : ... (∀ α -> Type α) : ...
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### Self-representation and universes in OTT

The question is about Observational Type Theory. Consider this setting: data level : Set where # : ℕ -> level ω : level _⊔_ : level -> level -> level # α ⊔ # β = # (α ⊔ℕ β) _ ⊔ _ = ...
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### Curry Howard correspondence and equality

A while ago I read that the function type a -> b corresponds to the relation a ≤ b, or is it a ≥ b? This makes sense to me because two types are isomorphic if we have a bijection between them (i.e. ...
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### Why do we need containers?

(As an excuse: the title mimics the title of Why do we need monads?) There are containers (and indexed ones) (and hasochistic ones) and descriptions. But containers are problematic and to my very ...
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### f#: encoding even and odd in (inductive) types?

I've been reading Practical Foundations for Programming Languages and found the Iterated and Simultaneous Inductive definitions interesting. I was able to pretty easily encode a mutually recursive ...
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### Provable coherence in OTT

I'm playing with observational type theory. Here is equality of π-types (π is the lowercase Π, i.e. π A B is the code for (x : A) -> B x) defined mutually with coercions: π A₁ B₁ ≃ π A₂ B₂ = σ (A₂...
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### Modeling System F's parametric polymorphism at Set₀

In System F, the kind of a polymorphic type is * (as that's the only kind in System F anyway...), so e.g. for the following closed type: [] ⊢ (forall α : *. α → α) : * I would like to represent ...
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### Why does `filter` work with higher-order occurrence typing?

On the homepage for Racket, they show this example: #lang typed/racket ;; Using higher-order occurrence typing (define-type SrN (U String Number)) (: tog ((Listof SrN) -> String)) (define (tog l) ...
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### Unification Weirdness in Typeclass Instance

Let's say I have the following (silly) class: class BlindMap m where mapB :: m a -> m b I could provide the following [] instance: instance BlindMap [] where mapB = map id The type of ...
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### Is it possible to type `min` in a normalizing theory such as System-F or the Calculus of Constructions?

This min definition below works on two church numbers and returns the least big. Each number becomes a continuation that sends its pred to the other, zig and zag, until zero is reached. Moreover, one ...
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### How to systematically compute the number of inhabitants of a given type?

How to systematically compute the number of inhabitants of a given type in System F? Assuming the following restrictions: All inhabitants terminate, i.e. no bottom. All inhabitants lack side-...
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### What's the absurd function in Data.Void useful for?

The absurd function in Data.Void has the following signature, where Void is the logically uninhabited type exported by that package: -- | Since 'Void' values logically don't exist, this witnesses the ...
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### Dependent types can prove your code is correct up to a specification. But how do you prove the specification is correct?

Dependent types are often advertised as a way to enable you to assert that a program is correct up to a specification. So, for example, you are asked to write a code that sorts a list - you are able ...
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### What is predicativity?

I have pretty decent intuition about types Haskell prohibits as "impredicative": namely ones where a forall appears in an argument to a type constructor other than ->. But just what is ...
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### Why is forall a. a not considered a subtype of Int while I can use an expression of type forall a. a anywhere one of type Int is expected?

Consider the following pair of function definitions, which pass the type checker: a :: forall a. a a = undefined b :: Int b = a I.e. an expression of type forall a. a can be used where one of type ...
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### How do I show that a Haskell type is inhabited by one and only one function?

In this answer, Gabriel Gonzalez shows how to show that id is the only inhabitant of forall a. a -> a. To do so (in the most formal iteration of the proof), he shows that the type is isomorphic to (...
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### Can I implement this newtype as a composition of other types?

I've written a newtype Const3 that's very similar to Const, but contains the first of three given type arguments: newtype Const3 a b c = Const3 { getConst3 :: a } I can define very many useful ...
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### Are there useful applications for the Divisible Type Class?

I've lately been working on an API in Elm where one of the main types is contravariant. So, I've googled around to see what one can do with contravariant types and found that the Contravariant package ...
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### How did the terms “leftmost” and “rightmost” (referring to generics) get their meaning?

Reading Angelika Langer's superb Generics FAQ, I'm finally starting to really grok some of the more subtle points of generics. But I'm still hungup on some of the jargon. My layman's understanding of ...
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### Function definition by induction principles in Agda

When playing around with proof verification in Agda, I realised that I used induction principles for some types explicitly and in other cases used pattern matching istead. I finally found some text ...
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### Algorithm W and monomorphic type coercion

I'm trying to write my own type inference algorithm for a toy language, but I'm running into a wall - I think algorithm W can only be used for excessively general types. Here are the expressions: ...
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### Differences between Agda and Idris

I'm starting to dive into dependently-typed programming and have found that the Agda and Idris languages are the closest to Haskell, so I started there. My question is: which are the main differences ...
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### How to prove the mutual equivalence of peirce, classic, excluded_middle, de_morgan_not_and_not and implies_to_or without using intuition in coq

I simplified the proof procedure of the mutual equivalence of peirce, classic, excluded_middle, de_morgan_not_and_not and implies_to_or primarily written in git@github.com:B-Rich/sf.git as following. ...
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### What does GADT offer that cannot be done with OOP and generics?

Are GADTs in functional languages equivalent to traditional OOP + generics, or there is a scenario where there are correctness constrants easily enforced by GADT but hard or impossible to achieve ...
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### Implementation of Transitivity of Equality in Agda (HoTT)

After hours of trying different versions of it, I give up. I just want to typecheck a proof of the transitivity of equality as stated in the HoTT-Book. I'm new to Agda so it might be just a small flaw ...
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### Interpretation of Partial Functions from Z to Isabelle/HOL

I am trying to write a predicate such that, "if a certain constant is true"(in this case if 'sec=ok') then the predicate will evaluate to False, because I've written an expression in the consequent of ...
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### What is the analog of Category in programming

I found that there is an isomorphism between logic and programming, called Curry-Howard correspondence, so is there any such equivalence for Category theory, which helps to understand things like ...
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### Is the type product (tuple) operator associative?

For example, given the types A, B and C: is A×B×C=(A×B)×C=A×(B×C) true, or is the tuple always 'flattened out'? Intuition would tell me that it is associative, but on the other hand that would mean ...
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### Function arity of a first-class function

I'm rewriting PHP type system and working on implementation of a more pure language. I'm implementing as much as I can in question of purism as functional and object-oriented language, like method-...
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### How to prove “~(nat = False)”, “~(nat = bool)” and “~(nat = True)” in coq

The following two propositions are easy to prove. Theorem nat_eq_nat : nat = nat. Proof. trivial. Qed. Theorem True_neq_False : ~(True = False). Proof. unfold not. intros. symmetry in H. ...
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### How can I prove a type is valid in Agda?

I'm trying to do proofs over dependent functions, and I'm running into a snag. So let's say we have a theorem f-equal f-equal : ∀ {A B} {f : A → B} {x y : A} → x ≡ y → f x ≡ f y f-equal refl = refl ...