5
votes
2answers
83 views

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 ...
2
votes
3answers
33 views

Currying with dependent types in agda

I assumed you could curry any function in Agda. So that you can always swap the order of the inputs. and a theorem expressing that even compiles: curry : {A : Set} -> {B : Set} -> {C : Set} ...
0
votes
1answer
53 views

Do I need heterogeneous equality?

Brief background: I'm implementing contexts and renamings using de Bruijn indices, and then extending those notions with an "undefined" name, written ε. The undefined name induces a partial order on ...
4
votes
3answers
163 views

Why is typecase a bad thing?

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 ...
2
votes
1answer
56 views

How to use Prop from UTT in Agda

In Ulf Norell's thesis he mentions that Agda is based on Luo's UTT. However, I can't find a way to use Prop there. Is there any way to do so?
0
votes
1answer
100 views

Cong, subst and equality type in dependently typed programming languages

In dependently typed type theory there's a equality type. Usually when this type is defined, a number of utilities, namely cong and subst are introduced. How expressive they are? Is it possible to ...
0
votes
2answers
85 views

Why dependently typed languages use weak head normal form to compare for convertibility

As far as I understand, almost all dependently typed languages use weak head normal form for convertibility. Why is it so? Why is it enough to check for convertibility (it seems not enough for me)? ...
3
votes
1answer
90 views

Representing inductive types

I implemented dependently typed lambda calculus in the spirit of this article: http://www.andres-loeh.de/LambdaPi/LambdaPi.pdf The calculus, works and I experimented with it and extended with several ...
3
votes
1answer
113 views

What does \forall (∀) actually mean in a signature?

From the bits and pieces of information I gathered about agda I'd (apparently erroneously) concluded that ∀ {A} was equivalent to {A : Set}. Now I noticed that flip : ∀ {A B C} -> (A -> B -> ...
2
votes
2answers
261 views

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 ...
2
votes
2answers
196 views

How can finite numbers work? (dependent types)

I'm interested in dependently typed languages. Finite numbers seem very usable to me. For example, to safely index fixed-size arrays. But the definition is not clear for me. The data type for finite ...
4
votes
1answer
285 views

Agda: how does one obtain a value of a dependent type?

I recently asked this question: An agda proposition used in the type -- what does it mean? and received a very well thought out answer on how to make types implicit and get a real compile time error. ...
1
vote
1answer
221 views

An agda proposition used in the type — what does it mean?

I am taking this from the "Brutal Introduction to Agda" http://oxij.org/note/BrutalDepTypes/ Suppose we want to define division by two on even numbers. We can do this as: div : (n : N) -> even n ...
2
votes
1answer
239 views

Problems with using of dependent pairs in Agda

I'm learning Agda by tutorial, and now I'm reading about dependent pairs. So, this is the fragment of code: data Σ (A : Set) (B : A → Set) : Set where _,_ : (a : A) → (b : B a) → Σ A B infixr 4 ...
31
votes
2answers
2k views

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 ...
4
votes
1answer
181 views

Implicit arguments and applying a function to the tail-part of fixed-size-vectors

I wrote an Agda-function applyPrefix to apply a fixed-size-vector-function to the initial part of a longer vector where the vector-sizes m, n and k may stay implicit. Here's the definition together ...
6
votes
2answers
239 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 ...
11
votes
1answer
776 views

Agda Type-Checking and Commutativity / Associativity of +

Since the _+_-Operation for Nat is usually defined recursively in the first argument, its obviously non-trivial for the type-checker to know that i + 0 == i. However, I frequently run into this issue ...
9
votes
2answers
422 views

Agda: parsing nested lists

I am trying to parse nested lists in Agda. I searched on google and the closest I have found is parsing addressed in Haskell, but usually libraries like "parsec" are used that are not available in ...
4
votes
1answer
336 views

Agda: my code doesn't type check (how to get implicit arguments right?)

"checkSimple" gets u, an element of the universe U, and checks if (nat 1) can be converted to a agda type given u. The result of the conversion is returned. Now I try to write a console program and ...
2
votes
3answers
467 views

Agda: parse a string with numbers

I am trying to parse a string with natural numbers in Agda. e.g., stringListToℕ "1,2,3" The result should be: Just (1 ∷ 2 ∷ 3 ∷ []) My current code is not quite right or by any means nice, but ...
3
votes
4answers
501 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 ...