*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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A monad is just a monoid in the category of endofunctors, what's the issue?

Who first said the following? A monad is just a monoid in the category of endofunctors, what's the problem? And on a less important note, is this true and if so could you give an explanation ...
258
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4answers
20k views

What does “coalgebra” mean in the context of programming?

I have heard the term "coalgebras" several times in functional programming and PLT circles, especially when the discussion is about objects, comonads, lenses, and such. Googling this term gives pages ...
133
votes
2answers
9k views

Real-world applications of zygohistomorphic prepromorphisms

Yes, these ones: {-#LANGUAGE TypeOperators, RankNTypes #-} import Control.Morphism.Zygo import Control.Morphism.Prepro import Control.Morphism.Histo import Control.Functor.Algebra import ...
58
votes
5answers
3k views

Monads as adjunctions

I've been reading about monads in category theory. One definition of monads uses a pair of adjoint functors. A monad is defined by a round-trip using those functors. Apparently adjunctions are very ...
57
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5answers
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 ...
43
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1answer
2k views

Simple examples to illustrate Category, Monoid and Monad?

I am getting very confused with these three concepts. Is there any simple examples to illustrate the differences between Category, Monoid and Monad ? It would be very helpful if there is a ...
41
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8answers
2k views

What is a monad in FP, in categorical terms?

Every time someone promises to "explain monads", my interest is piqued, only to be replaced by frustration when the alleged "explanation" is a long list of examples terminated by some off-hand remark ...
36
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2answers
332 views

Does the free monad always exist?

We know from the category theory that not all endofunctors in Set admit a free monad. The canonical counterexample is the powerset functor. But Haskell can turn any functor into a free monad. data ...
34
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2answers
1k views

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 ...
30
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3answers
3k 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 ...
29
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3answers
1k views

What are the adjoint functor pairs corresponding to common monads in Haskell?

In category theory, a monad can be constructed from two adjoint functors. In particular, if C and D are categories and F : C --> D and G : D --> C are adjoint functors, in the sense that there is a ...
28
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2answers
2k views

Can liftM differ from liftA?

According to the Typeclassopedia (among other sources), Applicative logically belongs between Monad and Pointed (and thus Functor) in the type class hierarchy, so we would ideally have something like ...
26
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5answers
1k views

What are zygo/meta/histo/para/futu/dyna/whatever-morphisms?

Is there a list of them with examples accessible to a person without extensive category theory knowledge?
26
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2answers
1k views

What are Haskell's monad transformers in categorical terms?

As a math student, the first thing I did when I learned about monads in Haskell was check that they really were monads in the sense I knew about. But then I learned about monad transformers and those ...
25
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3answers
2k views

Are all Haskell functors endofunctors?

I'm a bit confused, and need someone to set me straight. Lets outline my current understanding: Where E is an endofunctor, and A is some category: E : A -> A. Since all types and morphisms in ...
25
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3answers
4k views

Resources for learning category theory [closed]

I am going to take a course on category theory soon. What resources can you recommend for learning about it? What parts are relevant to learn and how do I learn to apply my knowledge?
25
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1answer
1k views

Difference between free monads and fixpoints of functors?

I was reading http://www.haskellforall.com/2013/06/from-zero-to-cooperative-threads-in-33.html where an abstract syntax tree is derived as the free monad of a functor representing a set of ...
23
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5answers
2k views

Can a monad be a comonad?

I know what a monad is. I think I have correctly wrapped my mind around what a comonad is. (Or rather, what one is seems simple enough; the tricky part is comprehending what's useful about this...) ...
23
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3answers
634 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 ...
22
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1answer
2k 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] ...
21
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3answers
856 views

What exactly are the categories that are being mapped by Applicative Functors?

I've been reading up on Applicative Functors and I am having difficulty reconciling a mismatch in the respective terminologies of category theory and functional programming. Although I have looked ...
21
votes
1answer
439 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 ...
19
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2answers
1k 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 ...
19
votes
2answers
629 views

To what extent are Applicative/Monad instances uniquely determined?

As described this question/answers, Functor instances are uniquely determined, if they exists. For lists, there are two well know Applicative instances: [] and ZipList. So Applicative isn't unique ...
19
votes
2answers
157 views

Relation between `DList` and `[]` with Codensity

I've been experimenting with Codensity lately which is supposed to relate DList with [] among other things. Anyway, I've never found code that states this relation. After some experiments I ended up ...
18
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5answers
816 views

Where do values fit in Category of Hask?

So we have Category of Hask, where: Types are the objects of the category Functions are the morphisms from object to object in the category. Similarly for Functor we have: a Type constructor as ...
18
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2answers
606 views

Are there a thing call “semi-monad” or “counter-monad”?

Well, I am studying Haskell Monads. When I read the Wikibook Category theory article, I found that the signature of monad morphisms looks pretty like tautologies in logic, but you need to convert M a ...
18
votes
1answer
710 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 ...
17
votes
1answer
707 views

Haskell: How is join a natural transformation?

I can define a natural transformation in Haskell as: h :: [a] -> Maybe a h [] = Nothing h (x:_) = Just x and with a function k: k :: Char -> Int k = ord the naturality condition is met ...
17
votes
1answer
559 views

Is there a generalization of these Free-like constructions?

I was playing around with free-like ideas, and found this: {-# LANGUAGE RankNTypes #-} data Monoid m = Monoid { mempty :: m, mappend :: m -> m -> m } data Generator a m = Generator { monoid :: ...
16
votes
1answer
755 views

High-Order ScalaCheck

Consider the following definition of a category: trait Category[~>[_, _]] { def id[A]: A ~> A def compose[A, B, C](f: A ~> B)(g: B ~> C): A ~> C } Here's an instance for unary ...
15
votes
1answer
232 views

Control.Category, what does >>> and <<< mean?

I am following this blog, to write a simple http server in haskell, Usage of >>> is not clear to me. What does this code snippet do? handleHttpConnection r c = runKleisli ...
15
votes
1answer
183 views

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 ...
15
votes
1answer
519 views

Representable Functor isomorphic to (Bool -> a)

I thought I'd try the intriguing Representable-functors package to define a Monad and Comonad instance for the functor given by data Pair a = Pair a a which is representable by Bool; as mentioned in ...
15
votes
4answers
603 views

What mathematical duals are there in OO programming?

If you have watched Going Deep shows of the Channel9 lately, one very frequently mentioned topic is mathematical duality in programming. TomasP has a good blog post about duality in object oriented ...
14
votes
3answers
882 views

How are functors in Haskell related to functors in category theory?

For as far as I understand, a functor is a mapping between two categories, for example from objects in to objects in where and are categories. In Haskell there is Hask in which the objects are ...
14
votes
3answers
783 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 ...
14
votes
1answer
413 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 -> ...
14
votes
1answer
653 views

Functor is for (a -> b) -> (f a -> f b), what is for (Category c) => c a b -> c (f a) (f b)?

I would like to have a function for either mapping a pure function to a container or sequencing applicative/monadic action through it. For pure mapping we have fmap :: Functor f => (a -> b) ...
13
votes
2answers
324 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 ...
13
votes
2answers
462 views

Are functions of arity-n really just an n-category due to currying? Can they be made into a 1-category?

This question has a longish prelude before I can actually ask it :) Let's say type A and B represent categories, then the function f :: B -> A is a morphism between the two categories. We can ...
13
votes
3answers
1k views

Is there a theory that combines category theory/abstract algebra and computational complexity?

Category theory and abstract algebra deal with the way functions can be combined with other functions. Complexity theory deals with how hard a function is to compute. It's weird to me that I haven't ...
13
votes
1answer
125 views

Are the “natural transformations” we apply on Coyoneda to get a Functor actually “natural transformations”?

I have a theoretical question about the nature of a type that is used in a lot of examples explaining the Coyoneda lemma. They are usually referred to as "natural transformations" which to my ...
13
votes
1answer
218 views

Is there a Codensity MonadPlus that asymptotically optimizes a sequence of MonadPlus operations?

Recently there was a question about the relation between DList <-> [] versus Codensity <-> Free. This made me think whether there is such a thing for MonadPlus. The Codensity monad improves the ...
13
votes
2answers
446 views

Can I model a list of successes with short circuiting failure via the composition of applicative functors?

The user 'singpolyma' asked on reddit if there was some general structure underlying: data FailList a e = Done | Next a (FailList a e) | Fail e A free monad was suggested, but I wondered if this ...
12
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2answers
460 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 ...
12
votes
1answer
642 views

What is this special functor structure called?

Suppose that F is an applicative functor with the additional laws (with Haskell syntax): pure (const ()) <*> m === pure () pure (\a b -> (a, b)) <*> m <*> n === pure (\a b ...
12
votes
1answer
389 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 ...
12
votes
1answer
516 views

How much is applicative really about applying, rather than “combining”?

For an uncertainty-propagating Approximate type, I'd like to have instances for Functor through Monad. This however doesn't work because I need a vector space structure on the contained types, so it ...
12
votes
1answer
475 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 ...