# Tagged Questions

Agda is a dependently typed, total functional programming language and a proof assistant.

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### what is the meaning of infixr in Agda?

Prp : Set₁ Prp = Set data _∧_ (P Q : Prp) : Prp where ∧-intro : P -> Q -> P ∧ Q infixr 2 _∧_ data _∨_ (P Q : Prp) : Prp where ∨-intro₁ : P -> P ∨ Q ∨-intro₂ : Q -> P ∨ Q infixr ...
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### Imported datatype clashes with locally defined one, even when renamed

With the following Agda code, I get an error on the definition of B in A₂: module Whatever where module A₁ where data B : Set where module A₂ where open A₁ renaming (B to B₁) data B : Set ...
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### Type error when trying to pattern-match on something that should be absurd anyway

In the middle of a type checker for the simply-typed lambda calculus, I have this: check Γ (lam τ′ E) (τ₁ ↣ τ₂) with τ′ T≟ τ₁ check Γ (lam τ′ E) (τ₁ ↣ τ₂) | no ¬p = no lem where lem : ¬ Γ ⊢ lam ...
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### Type Hierarchy in Agda

I am trying to figure out how type hierarchies work in Agda. Assuming I define a set type X: X : Set and then proceed to constructing an inductive type data Y : X -> Set where What is the ...
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### Agda: Pair of vectors that have the same length

In Agda, how can I define a pair of vectors that must have the same length? -- my first try, but need to have 'n' implicitly b : ∀ ( n : ℕ ) → Σ (Vec ℕ n) (λ _ → Vec ℕ n) b 2 = (1 ∷ 2 ∷ []) , (3 ∷ ...
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### Do Hask or Agda have equalisers?

I was somewhat undecided as to whether this was a math.SE question or an SO one, but I suspect that mathematicians in general are fairly unlikely to know or care much about this category in ...
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### Recursion Schemes in Agda

Needless to say, the standard construction in Haskell newtype Fix f = Fix { getFix :: f (Fix f) } cata :: (Functor f) => (f a -> a) -> Fix f -> a cata f = f . fmap (cata f) . getFix ...
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### Agda: run function for Conor's stack example

At ICFP 2012, conor mcbride gave a keynote with the tile "Agda-curious?". It featured a small stack machine implementation. The video is on youtube: http://www.youtube.com/watch?v=XGyJ519RY6Y The ...
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### Agda: Equivalence relation for sub-colists

I would like to define an equality on CoList (Maybe Nat)s that only takes the justs into account. Of course, I can't just go from CoList (Maybe A) to CoList A, because that wouldn't necessarily be ...
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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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### 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 ...
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### Haskell's Arrow-Class in Agda and -> in Agda

I have two closely related questions: First, how can the Haskell's Arrow class be modeled / represented in Agda? class Arrow a where arr :: (b -> c) -> a b c ...
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### Proofs involving decidable equality

I'm trying to prove some simple things about a function which uses decidable equality. Here is a much simplified example: open import Relation.Nullary open import Relation.Binary open import ...
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### Proof that (prev n) <= m starting from n <= m

I have the next definition: data Nat : Set where zero : Nat succ : Nat -> Nat prev : Nat -> Nat prev zero = zero prev (succ n) = n data _<=_ : Nat -> Nat -> Set where z<=n : ...
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### 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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### 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 ...
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### Why inductive datatypes forbid types like `data Bad a = C (Bad a -> a)` where the type recursion occurs in front of ->?

Agda manual on Inductive Data Types and Pattern Matching states: To ensure normalisation, inductive occurrences must appear in strictly positive positions. For instance, the following datatype is ...
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### Why can't (Set -> Set) have type Set?

In Agda, the type of a forall is determined in such a way that the following all have type Set1 (where Set1 is the type of Set and A has type Set): Set → A A → Set Set → Set However, the following ...
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### Types containing with/rewrite clauses in agda, or, how to use rewrite instead of subst?

First some boring imports: import Relation.Binary.PropositionalEquality as PE import Relation.Binary.HeterogeneousEquality as HE import Algebra import Data.Nat import Data.Nat.Properties open PE open ...
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### 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 ...
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### 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 ...
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### 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 ...
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### What is the combinatory logic equivalent of intuitionistic type theory?

I recently completed a university course which featured Haskell and Agda (a dependent typed functional programming language), and was wondering if it was possible to replace lambda calculus in these ...
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### “Real” programs written in Agda [closed]

Agda is a nice programming language to explore dependent types and play around with intuitionistic type theory and to experiment with the implementation of these things. But are there already ...
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### Turning a <= b to suc a <= suc b

This is an extension of the question posted here: Agda and Binary Search Trees I have trans₁ : ∀ {a b c} → suc a ≤ suc b → suc b ≤ c → suc a ≤ c for the definition of trans₁, but this would ...
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### Agda and Binary Search Trees

Just a note, this is for an assignment, so probably best not to post complete solutions, rather, I'm just stuck and need some hints as to what I should be looking at next. module BST where open ...
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### Agda, Boolean Proposition

A foreword note that this is for an assignment. A question has already been asked about for the first question. So we have the data type: data BoolProp : ??? where ptrue : BoolProp true pfalse : ...
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### Converting Haskell code to Agda

We have to convert this haskell data type into agda code: data TRUE data FALSE data BoolProp :: * -> * where PTrue :: BoolProp TRUE PFalse :: BoolProp FALSE PAnd :: BoolProp a -> BoolProp b ...
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### Avoiding extensionality postulate when defining non-unary functions over quotient types

I'm trying to define functions with more than one arguments over quotient types. Using currying, I can reduce the problem to defining functions over the pointwise product setoid: module Foo where ...
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### Installing Agda onto Windows 7

I'm having trouble running Agda on my windows 7 64-bit pc. I tried running the following commands: cabal install agda and cabal install agda-executable which both work, but I still can't seem ...
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### ≡-Reasoning and 'with' patterns

I was proving some properties of filter and map, everything went quite good until I stumbled on this property: filter p (map f xs) ≡ map f (filter (p ∘ f) xs). Here's a part of the code that's ...
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### Finding out which metas are unsolved in an Agda program

What's the best way to find out what's causing unsolved metas? Is there a way to turn all unsolved metas (and only the unsolved ones) into holes, by expanding all the surrounding wildcards that are ...
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### Can Agda compile faster in batch mode?

When I compile an Agda program that uses the standard library, the compiler spends a long time printing out lines such as: Skipping Relation.Binary.Consequences ...
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### Agda as a programming language

I have found a lot of useful information on using Agda as a proof system. I have found virtually no information on using Agda to write usable programs. I cannot even find a "hello world" example that ...
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### 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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### 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 learn agda

I am trying to learn agda. However, I got a problem. All the tutorials which I found on agda wiki are too complex for me and cover different aspects of programming. After parallel reading of 3 ...
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### Congruence for heterogenous equality

I'm trying to use heterogenous equality to prove statements involving this indexed datatype: data Counter : ℕ → Set where cut : (i j : ℕ) → Counter (suc i + j) I was able to write my proofs using ...
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### Eliminating subst to prove equality

I'm trying to representat mod-n counters as a cut of the interval [0, ..., n-1] into two parts: data Counter : ℕ → Set where cut : (i j : ℕ) → Counter (suc (i + j)) Using this, defining the two ...
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### Termination of structural induction

I can't get Agda's termination checker to accept functions defined using structural induction. I created the following as the, I think, simplest example exhibiting this problem. The following ...
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### Parametrized Inductive Types in Agda

I'm just reading Dependent Types at Work. In the introduction to parametrised types, the author mentions that in this declaration data List (A : Set) : Set where [] : List A _::_ : A → List A → ...
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### A definition for finite sets in Agda

I am new to Agda. I'm reading the paper "Dependent Types at Work" by Ana Bove and Peter Dybjer. I don't understand the discussion of Finite Sets (on page 15 in my copy). The paper defines a Fin ...
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### Unsafe coerce and more efficient Agda code (-ftrust-me-im-agda)

On the Agda mailing list, Conor McBride asked: is there any way to get hold of operations like a putative trustFromJust :: Maybe x -> x which doesn't actually check for Just and ...
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I'm trying to prove a simple lemma in Agda, which I think is true. If a vector has more than two elements, taking its head following taking the init is the same as taking its head immediately. ...
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### “Strictly positive” in Agda

I'm trying to encode some denotational semantics into Agda based on a program I wrote in Haskell. data Value = FunVal (Value -> Value) | PriVal Int | ConVal Id [Value] ...