*Category theory* is a branch of abstract mathematics concerned with exposing and describing the underlying structure of logical and mathematical systems. Concepts from category theory have proven to be extremely effective as tools for structuring both the semantics of programming languages and ...

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What is the category-theoretical basis for the requirement that the Haskell “id” function must return the same value as passed in?

How can the following all be true? In the Hask category, the Objects are Haskell types and the Morphisms are Haskell functions. Values play no role in Hask. The identity Morphism is defined as an ...
10
votes
2answers
346 views

Are there contravariant monads?

Functors can be covariant and contravariant. Can this covariant/contravariant duality also be applied to monads? Something like: class Monad m where return :: a -> m a (>>=) :: m a ...
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votes
1answer
26 views

In the category of sets, why are singleton sets terminal?

I'm trying to understand why the category of sets is defined the way it is, with singleton sets as terminal objects. If the "Set" category contains all of the possible sets, and all of the possible ...
2
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0answers
43 views

Background on Agda Categories library?

I'm trying to understand the Categories library, but I'm fairly new to Agda, so I'm looking for some sort of document explaining the choices that were made in the implementation of the library. ...
3
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2answers
117 views

Do notation and Monad composition

Im a Haskell beginner and I'm still learning about Category Theory and its practical use in computer science. I've spent last day watching couple lectures from Berkley's university about category ...
4
votes
1answer
113 views

Haskell - Functor instance for generic polymorphic Algebraic Data Types using recursion-schemes

Problem: Recently I asked the following question on here, asking how to create a generic map function, and a generic instance of Functor for any arbitrary polymorphic ADT (Algebraic Data Type), like ...
8
votes
2answers
157 views

Functor instance for generic polymorphic ADTs in Haskell?

When it comes to applying category theory for generic programming, Haskell does a very good job, for instance with libraries like recursion-schemes. But one thing I'm not sure of is how to create a ...
12
votes
1answer
278 views

What is exactly an indexed functor in Haskell and what are its usages?

When studying functors in Haskell I came up with Functor.Indexed type of functor. This functor defines an operation called imap. I didn't understood its definition and imap signature: imap :: (a -> ...
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1answer
102 views

What are the attributes that make 'types-first' programming in Scala have less code and less bugs?

I attended a Scala course called 'Patterns in Types' based on this repository. The course covers the following ideas: Error Monad Reader Monad Writer Monad State Monad Reader Monad Transformer ...
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1answer
48 views

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 ...
4
votes
1answer
82 views

Generalization of Exponential Type

How (if at all) does the exponential interpretation of (->) (a -> b as $b^a$) generalize to categories other than Hask/Set? For example it would appear that the interpretation for the category ...
5
votes
2answers
76 views

Proper way to wrap selectively class instances (or “lift” functions like `sortBy`, `minimumBy`, … automatically)

Let some type instanced to many classes. What is the proper way to replace, selectively, certain instances's behaviors? One way to express it could be construct the by operator then data Person ... ...
11
votes
2answers
261 views

List based on right Kan extension

In the ``Kan Extensions for Program Optimisation'' by Ralf Hinze there is the definition of List type based on right Kan extension of the forgetful functor from the category of monoids along itself ...
2
votes
1answer
144 views

Matrix as Applicative functor, which is not Monad

I run into examples of Applicatives that are not Monads. I like the multi-dimensional array example but I did not get it completely. Let's take a matrix M[A]. Could you show that M[A] is an ...
9
votes
1answer
137 views

Open Type Level Proofs in Haskell/Idris

In Idris/Haskell, one can prove properties of data by annotating the types and using GADT constructors, such as with Vect, however, this requires hardcoding the property into the type (e.g. a Vect has ...
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votes
2answers
211 views

Is there a term for a monad that is also a comonad?

I'm just wondering whether there's a concise term for something that's both a monad and a comonad. I've done some searching, and I know these structures exist, but I haven't found a name for them.
9
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1answer
621 views

Defining Categories and Category Laws in Haskell

I am having fun learning Category Theory by directly translating the definitions and laws to Haskell. Haskell is not Coq of course but it helps me getting an intuition for Category Theory. My question ...
3
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0answers
72 views

Are type-level functors just functors in the 2-category of Hask?

From what I understand, the typical interpretation of the Hask category is that the objects of the category are Haskell types, and the morphisms are Haskell functions. With that interpretation: {-# ...
7
votes
1answer
97 views

What is the general case of QuickCheck's promote function?

What is the general term for a functor with a structure resembling QuickCheck's promote function, i.e., a function of the form: promote :: (a -> f b) -> f (a -> b) (this is the inverse of ...
2
votes
1answer
150 views

Type equality in higher order kleisli (scala)

The Story so far - type :**:[F[_], G[_]] = ({ type λ[α] = F[G[α]] }) trait HBind[M[_]] extends HFunctor[M] { def hbind[F[_], G[_]](f: F ~> (M :**: G)#λ)(implicit MG: Functor[(M :**: G)#λ], F: ...
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vote
2answers
346 views

LYHFGG: “Monads are just applicative functors that support >>=”. In what sense is this statement true?

In LYHFGG the author states that "Monads are just applicative functors that support >>=" (see image below). I don't see how this statement can be true if I look at the definition of Monad type class. ...
7
votes
2answers
132 views

Can two non-functors compose to a functor?

We can have two types f, g :: * -> * such that they're not monads, but their composition is. For example for an arbitrary fixed s: f a := s -> a g a := (s, a) g a isn't a monad (unless we ...
5
votes
1answer
90 views

Categories library for Agda?

Are there any "recommended" libraries that provide a easy-to-use formalisation of basic category theory in Agda? The Agda standard library seems to provide very little in this regard. I'm looking for ...
21
votes
1answer
387 views

Arrow without arr

If we restrict our understanding of a category to be the usual Category class in Haskell: class Category c where id :: c x x (>>>) :: c x y -> c y z -> c x z Then let's say that ...
5
votes
1answer
180 views

Bicategories in Haskell

I am trying to define a type class for bicategories and instantiate it with the bicategory of categories, functors and natural transformations. {-# LANGUAGE NoImplicitPrelude, MultiParamTypeClasses, ...
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2answers
434 views

If MonadPlus is the “generator” class, then what is the “consumer” class?

A Pipe can be broken into two parts: the generator part (yield) and the consumer part (await). If you have a Pipe that only uses it's generator half, and only returns () (or never returns), then it ...
1
vote
1answer
141 views

C++ functor (mapping)

I have created a class either<l, r> much like Haskell's Either a b. I have also implemented a function map directly in the class; this is what the code looks like: template<typename l, ...
8
votes
1answer
154 views

Are haskell data types co-algebras by default?

I'm trying to get my head around F-algebras, and this article does a pretty good job. I understand the notion of a dual in category theory, but I'm having a hard time understanding how F-coalgebras ...
17
votes
1answer
661 views

How does lifting (in a functional programming context) relate to category theory?

Looking at the Haskell documentation, lifting seems to be basically a generalization of fmap, allowing for the mapping of functions with more than one argument. The Wikipedia article on lifting ...
6
votes
0answers
257 views

Generalizing Haskell: could we replace Hask with Cat? [closed]

It is great that Haskell allows us to walk around in the category Hask. But sometimes I feel it is too tight. So I had this idea about a programming language that would allow us to move around in the ...
26
votes
3answers
2k views

Arrows are exactly equivalent to applicative functors?

According to the famous paper Idioms are oblivious, arrows are meticulous, monads are promiscuous, the expressive power of arrows (without any additional typeclasses) should be somewhere strictly ...
53
votes
4answers
1k views

Is there a monad that doesn't have a corresponding monad transformer (except IO)?

So far, every monad (that can be represented as a data type) that I have encountered had a corresponding monad transformer, or could have one. Is there such a monad that can't have one? Or do all ...
3
votes
0answers
178 views

Combining the state monad with the costate comonad

How to combine the state monad S -> (A, S) with the costate comonad (E->A, E)? I tried with both obvious combinations S -> ((E->A, E), S) and (E->S->(A, S), E) but then in either ...
14
votes
3answers
773 views

Is the concept of an “interleaved homomorphism” a real thing?

I am in need of the following class of functions: class InterleavedHomomorphic x where interleaveHomomorphism :: (forall a . f a -> g a) -> x f -> x g Obviously the name I invented for ...
4
votes
1answer
209 views

Free Applicative in Scala

Looking through the haskell free package (http://hackage.haskell.org/package/free-3.4.2) there's a few types that seem simple and useful, that I see almost no literature on outside of haskell, the ...
17
votes
1answer
1k views

Step by Step / Deep explain: The Power of (Co)Yoneda (preferably in scala) through Coroutines

some background code /** FunctorStr: ∑ F[-]. (∏ A B. (A -> B) -> F[A] -> F[B]) */ trait FunctorStr[F[_]] { self => def map[A, B](f: A => B): F[A] => F[B] } trait Yoneda[F[_], A] ...
14
votes
2answers
738 views

What does a nontrivial comonoid look like?

Comonoids are mentioned, for example, in Haskell's distributive library docs: Due to the lack of non-trivial comonoids in Haskell, we can restrict ourselves to requiring a Functor rather than some ...
5
votes
1answer
395 views

In what way is Scala's Option fold a catamorphism?

The answer to this question suggests that the fold method on Option in Scala is a catamoprhism. From the wikipedia a catamophism is "the unique homomorphism from an initial algebra into some other ...
8
votes
1answer
247 views

Do the functor laws prove complete preservation of structure?

In the documenation for Data.Functor the following two are stated as the functor laws, which all functors should adhere to. fmap id == id fmap (f . g) == fmap f . fmap g The way my intuition ...
7
votes
2answers
371 views

Higher order Functors in scala

So I've been trying to push my intuitions of functors to their limits by defining a higher order functor i.e. a, F that takes 1st order types as type argument, and functions and lifts functions on 1st ...
21
votes
3answers
420 views

Lax monoidal functors with a different monoidal structure

Applicative functors are well-known and well-loved among Haskellers, for their ability to apply functions in an effectful context. In category-theoretic terms, it can be shown that the methods of ...
6
votes
4answers
233 views

“Transposition” of functors?

Recently I had to write the following function: mToL :: Maybe [a] -> [Maybe a] mToL Nothing = [] mToL (Just xs) = map Just xs This begged the question whether it is possible to generalize the ...
6
votes
2answers
265 views

Is there a name for arrows of the type a -> a (in Haskell notation) in category theory?

Whats the name of arrows in category theory that have this type: a -> a "From a type(?) to another object of the same type" Or maybe there's no particular name for them? In other words: Is ...
5
votes
1answer
224 views

Where's the functor in the natural transformation?

I've had this question on the very back of my mind ever since I saw the definition of natural transformations in the Edward Kmett's old category-extras package: -- | A natural transformation between ...
7
votes
4answers
412 views

Why Functor class has no return function?

From categorical point of view, functor is pair of two maps (one between objects and another between arrows of categories), following some axioms. I have assumed, what every Functor instance is ...
3
votes
1answer
196 views

Where Haskell category composition is used regardless of instance?

I think I almost figured out what Category class represents. However at this level of abstraction it makes me wonder where I could find generic use for it. What code using . or id from ...
4
votes
1answer
499 views

Reverse Function Composition in Haskell

Consider the following Haskell code: countWhere :: (a -> Bool) -> [a] -> Int countWhere predicate xs = length . filter predicate $ xs In JavaScript this would be written as follows: ...
12
votes
1answer
350 views

How are uncurry and fanin related in category theory?

In a library I'm writing I've found it to be seemingly elegant to write a class that is similar to (but slightly more general than) the following, which combines both the usual uncurry over products ...
6
votes
3answers
335 views

Monads from all angles - Mathematical, diagramatic and programmatical

I am trying to reconcile the Categorical definition of Monad with the other general representations/definitions that I have seen in some other tutorials/books. Below, I am (perhaps forcefully) trying ...
2
votes
1answer
65 views

Decidability of bi-cartesian closed categories

Is the decision problem for the free bi-cartesian closed category (BCCC) decidable? Equivalently, is equality decidable for the simply-typed lambda calculus extended with strong n-ary products and ...