Dependent types are types that depend on values. Very few languages support them - examples include Agda, Coq, Epigram, Scala (by path-dependent-types, a close variant) and Idris which aspires to produce system-level quality native code.

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Choosing a typeclass on construction of a data type

I have a a data type in idris: data L3 = Rejected | Unproven | Proven which I verified to be a ring with unity, a lattice, a group and some other properties too. Now I want to create an object, ...
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Haskell - How to define the dependent type Remainder (i.e. Rmndr modulo)?

My understanding is that the remainder type is a dependent type (depending on the modulo). I read about the DataKinds extension and was able to define it like the following: {-# LANGUAGE DataKinds, ...
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Reflecting Heterogeneous Promoted Types back to Values, Compositionally

I've been playing with -XDataKinds recently, and would like to take a promoted structure build with type families and pull it back down to the value level. I believe this is possible because the ...
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Proving associativity of natural number addition using Scala shapeless

The following code is Idris: natAssociative : (a : Nat) -> (b : Nat) -> (c : Nat) -> (a + b) + c = a + (b + c) natAssociative Z b c = the (b + c = b + c) refl natAssociative (S k) b c = ...
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Unusual Kinds and Data Constructors

I don't know how I didn't notice this, but data constructors and function definitions alike can't use types with kinds other than * and it's variants * -> * etc., due to (->)'s kind signature, ...
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Declaring and working with Kinds in Haskell

I've been playing with Haskell's -XDataKinds feature quite a lot recently, and have found myself wanting to create a kind. I'm not sure if my wishes can come true, but from Edward Kmett's constraints ...
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Doing rank-n quantification in Idris

I can only do rank-n types in Idris 0.9.12 in a rather clumsy way: tupleId : ((a : Type) -> a -> a) -> (a, b) -> (a, b) tupleId f (a, b) = (f _ a, f _ b) I need the underscores wherever ...
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Are there other HOL programming languages besides Caledon that are based on haskell?

There are programming languages and theorem prover based on higher order logic (HOL). Examples include Twelf, lambda prolog, Isabelle. For example Twelf is is both a programming language and a theorem ...
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How to convince ghc that type level addition is commutative (to implement dependently typed reverse)?

This does not compile because as ghc tells me Add is not injective. How do I tell the compiler that Add is really commutative (maybe by telling it that Add is injective)? It seems from the hasochism ...
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Testing if a type is a function type in Idris

I want to have a function that determines if a type is a function type, like this: isFunction : Type -> Bool isFunction (a -> b) = True isFunction _ = False This returns True for all inputs, ...
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Dependent method types conflict with default arguments

When playing with scala's dependent method types, I encountered a conflict with default method parameters: abstract class X { type Y case class YY(y: Y) } object XX extends X { type Y = String ...
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Is the name of a non-static-member dependent when used within a non-static member function?

Both gcc 5.0 and clang 3.6 require the typename keyword in the following example: template<int n> struct I { typedef int Type; }; template<typename T> struct A { int m; void ...
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27 views

Is a function call expression with a single non-type template parameter argument type-dependent?

Both clang 3.6 and gcc 5.0 require typename in the following example: template<typename T> struct B { typedef int Type; }; void f(int); template<int n> struct A { typedef ...
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Can a throw or delete expression ever be dependent?

Both gcc 5.0 and clang 3.6 require the typename keyword in the following example: template<typename T> struct B { typedef int Type; }; template<int n> struct A { typedef typename ...
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174 views

Can sizeof nested twice ever be a dependent expression?

I noticed that gcc 5.0 rejects the following code, while clang 3.6 accepts it. template<int n> struct I { typedef int Type; }; template<typename T> struct A { typedef ...
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190 views

What is the difference between path-dependent types and dependent types?

Scala has path-dependent types, but it is said that Scala doesn’t support dependent typing. What is the difference between path-dependent types and dependent types? As far as I understand, ...
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Promoting complex GADTs

I've been toying around with -XDataKinds recently, and was wondering why Foo below won't be automatically promoted: {-# LANGUAGE GADTs , DataKinds , KindSignatures #-} import Data.HList ...
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Implementing Total Parsers in Idris Based on a Paper on Agda

I am trying to implement total parsers with Idris, based on this paper. First I tried to implement the more basic recogniser type P: Tok : Type Tok = Char mutual data P : Bool -> Type where ...
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38 views

How to apply theorems for definitions with restrictions in coq

I found a number of examples of definitions with restrictions in coq. Here is for example a variation of the pred function: Lemma Lemma_NotZeroIsNotEqualToZero : ~ 0 <> 0. Proof. omega. Qed. ...
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scala path dependent types and type level proofs

I am currently trying to define a model of a clocked dataflow language in scala. A flow virtually represents an infinite sequence of values of some type T, paced by some clock C (a clock indicates ...
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80 views

Deep conversion of Map to TreeMap

I need to convert arbitrary nested Map to TreeMap. Examples: Map[Int, String] -> TreeMap[Int, String] Map[Int, Map[Int, String]] -> TreeMap[Int, TreeMap[Int, String]] ... etc I've got working ...
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Dependent Types: How is the dependent pair type analogous to a disjoint union?

I've been studying dependent types and I understand the following: Why universal quantification is represented as a dependent function type. ∀(x:A).B(x) means “for all x of type A there is a ...
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Is there a nice way to use `->` directly as a function in Idris?

One can return a type in a function in Idris, for example t : Type -> Type -> Type t a b = a -> b But the situation came up (when experimenting with writing some parsers) that I wanted to ...
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Forall quantifier and complex boolean propositions in Idris

I'm new to dependent types and, having a Haskell experience, am slowly learning Idris. For an exercize, I want to write a Huffman encoding. Currently I'm trying to write a proof that the "flattening" ...
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How do I build a list with a dependently-typed length?

Dipping my toe into the waters of dependent types, I had a crack at the canonical "list with statically-typed length" example. {-# LANGUAGE DataKinds, GADTs, KindSignatures #-} -- a kind declaration ...
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Why was the ATS language dropped from the Computer Language Benchmarks Game? [closed]

Not too long ago the "ATS" programming language was removed from the Computer Language Benchmarks Game. You can still view the old pages via the way back machine. Why is the ATS programming language ...
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Prove So (0 < m) -> (n ** m = S n)

I'm trying to make an Idris function of type (j : Nat) -> {auto p : So (j < n)} -> Fin n to convert a Nat into a Fin n. To get the Z case to work (and output FZ), I'm trying to prove that a ...
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2answers
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Example of a `Type 1` that is neither `Type` nor an inhabitant of `Type`

What is an example of an inhabitant of Type 1 that is neither Type nor an inhabitant of Type? I wasn't able to come up with anything while exploring in the Idris REPL. To be more precise, I'm looking ...
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130 views

How does one prove a type of the form (a | b) in agda?

In thinking about: In Agda is it possible to define a datatype that has equations? I was playing with the following datatype: data Int : Set where Z : Int S : Int -> Int P : Int ...
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159 views

What would the type of a list of cascading functions be?

In Haskell syntax, we can have a (abstract) type like [a -> b], which is a list of functions a to b. A concrete type of this would be [Int -> Int], such as map (*) [1..10]. Is it possible to ...
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How or is that possible to prove or falsify `forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q.` in Coq?

I want to prove or falsify forall (P Q : Prop), (P -> Q) -> (Q -> P) -> P = Q. in Coq. Here is my approach. Inductive True2 : Prop := | One : True2 | Two : True2. Lemma True_has_one : ...
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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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Where to start with dependent type programming? [closed]

There is an Idris tutorial, an Agda tutorial and many other tutorial style papers and introductory material with never ending references to things yet to learn. I'm kind of crawling in the middle of ...
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119 views

Class method with heterogeneous recursive infinite and dependent type argument

I'm stuck playing with "heterogeneous recursive infinite type" (some better title?). Let the next working "Deep Sort" class Ord f => DeepSort f where deepSort :: f -> f deepSort = id ...
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Implicit conversions for members that are types

given: implicit class WithRetType[T, U](x: T => U) { type Ret = U } this: val foo = (_: Int) * 2 val x: foo.Ret = 3 yields: error: type Ret is not a member of Int => Int val x: ...
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How to make Vect n Int an instance of Monoid

In Idris, Vect n a is a datatype representing a vector of n length containing items of type a. Imagine I have a function: foo : Int -> Vect 4 Int foo n = [n-1, n, n+1, n*4] The body of the ...
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Declare variable whose type is a function's return type

I'm currently using a type alias: type FooType = Int val foo = (_: Int) * 2 def takeFooRet(x: FooType) = ... however, I'd like to do something like: val foo = (_: Int) * 2 def takeFooRate(x: ...
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Chaining path-dependent types and instantiating them when they having different parameter lists in Scala

I'm experimenting with writing more statically type-safe code by implementing a simple card game. In this game, there are several unique cards and each card has a card-specific effect which may ...
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80 views

Coq dependent types

I am new to Coq and need some help with some of trivial examples to get me started. In particular I am interested in defining some operations of vectors (fixed size lists) using dependent types. I ...
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Why is typecase a bad thing? [closed]

Both Agda and Idris effectively prohibit pattern matching on values of type Type. It seems that Agda always matches on the first case, while Idris just throws an error. So, why is typecase a bad ...
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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 ...
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Is there a language with constrainable types?

Is there a typed programming language where I can constrain types like the following two examples? A Probability is a floating point number with minimum value 0.0 and maximum value 1.0. type ...
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Can you create functions that return functions of a dependent arity in a dependently typed language?

From what I know about dependent types, I think that it should possible, but I've never seen an example of this before in a dependently typed language, so I'm not exactly sure where to start. What I ...
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Path-dependent type's value not found

Maybe I need a refresher on dependent types, but I don't understand why the following does not work: trait Code { type In; type Out } trait Handler[In, Out] class Foo(val code: Code)(handler: ...
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How to make a type with restrictions

For example I want to make a type MyType of integer triples. But not just Cartesian product of three Integer, I want the type to represent all (x, y, z) such that x + y + z = 5 How do I do that? ...
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Can dependent types abstract over n-arg functions?

In dynamically typed languages I can create a function that takes a function as an argument and returns a function. For example the memoize function in Clojure. (def memoized-fn (memoize ...
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How to rewrite a function body in Idris so that the type corresponds to the function signature and the whole thing compiles

I would like for this to compile: foo: Vect n String -> Vect n String foo {n} xs = take n xs This fails to compile because the compiler cannot unify n with n + m. I understand that this is ...
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571 views

How to use dependent pairs

Suppose I have a function (it really does what the name says): filter : ∀ {A n} → (A → Bool) → Vec A n → ∃ (λ m → Vec A m) Now, I'd like to somehow work with the dependent pair I return. I wrote ...
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255 views

Implicit length arguments in fixed-length-vector-functions in Agda

I wrote an Agda-function prefixApp which applies a Vector-Function to a prefix of a vector: split : {A : Set}{m n : Nat} -> Vec A (n + m) -> (Vec A n) * (Vec A m) split {_} {_} {zero} xs ...
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Difference between type parameters and indices?

I am new to dependent types and am confused about the difference between the two. It seems people usually say a type is parameterized by another type and indexed by some value. But isn't there no ...