*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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6
votes
2answers
209 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 ...
4
votes
1answer
155 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 ...
6
votes
4answers
263 views

Why Functor class has not 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
123 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 ...
3
votes
1answer
211 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
279 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 ...
4
votes
3answers
274 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
47 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 ...
0
votes
1answer
121 views

Introduction to Category Theory without Haskel, Scala or F#

I wan't to get introduced to the fundamental concepts of Category Theory, from a developer's perspective (not a math student), but every single resource I see uses Haskel, Scala, F# or other ...
4
votes
2answers
175 views

Generalized `fold` or how to perform `fold` and `map` at a time

(Apology by the title, I can't do better) My question is to find some generalized struct or "standard" function to perform the next thing: xmap :: (a -> b) -> f a -> g b then, we can map ...
3
votes
1answer
155 views

Pithy summary for comonad. (Where a monad is a 'type for impure computation')

In terms of pithy summaries - this description of Monads seems to win - describing them as a 'type for impure computation'. What is an equivalent pithy (one-sentence) description of a comonad?
15
votes
5answers
357 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 ...
14
votes
3answers
376 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 ...
17
votes
1answer
567 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 ...
2
votes
1answer
200 views

Scala comonads; Comonad laws?

So given this encoding of a comonad (see below) are the comonad laws above it correct? for some reason I don't think they are from looking at them, and I know that heading off wrong from there will ...
3
votes
1answer
192 views

How is anamorphism related to lens?

How is the Lens, the record accessor, e.g. http://hackage.haskell.org/packages/archive/lens/3.9.0.2/doc/html/Control-Lens-Type.html#t:Lens related to anamorphism? e.g. ...
10
votes
1answer
584 views

It's not a monad, but what is it?

According to the Haskell wikibook, a Monad called m is a Functor with two additional operations: unit :: a -> m a join :: m (m a) -> m a That's nice, but I have something slightly different. ...
10
votes
1answer
466 views

What's the history behind the Functor type class?

I'm trying to gain a really deep understanding of the Monad hierarchy of classes. Part of that is, of course, seeing lots of examples, but I'm particularly interested in the history of how these ...
16
votes
5answers
846 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...) ...
9
votes
1answer
263 views

Every monad is monoid?

Since every Monad is a Monoid on the sequencing operation. Why doesn't Monad inherit Monoid in haskell?
12
votes
1answer
486 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 ...
184
votes
3answers
15k 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 ...
6
votes
2answers
336 views

Applying Semantics to Free Monads

I am trying to abstract the pattern of applying a certain semantics to a free monad over some functor. The running example I am using to motivate this is applying updates to an entity in a game. So I ...
38
votes
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 ...
2
votes
1answer
95 views

Are lax natural transformations just natural transformations without naturality?

In page 4 of Theorems for free!, Philip Wadler says that parametricity can be expressed in terms of lax natural transformations. Is he referring to the fact that parametrically polymorphic functions ...
12
votes
2answers
386 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 ...
2
votes
0answers
148 views

A little category theory [duplicate]

One of the standard newbie Haskell questions is a remark isomorphic to "what the holy hell is a monad?!" The canonical answer to this question is infamously defined as "a monad is simply a monoid in ...
31
votes
2answers
914 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 ...
16
votes
1answer
507 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 :: ...
9
votes
3answers
442 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 ...
2
votes
1answer
243 views

Functors and free objects in Hask

Based on Wikipedia's definition of a free object, it seems to me that every Functor is Free in Hask. Conversely, every free object should also be a Functor. Is this correct, or am I ...
4
votes
4answers
409 views

Why does Haskell have non-strict functions (semantics)? [closed]

According to this article on denotational semantics in haskell All types have bottom, and a function f:A->B is strict if it maps the bottom of type A to the bottom of type B, it is called non-strict ...
5
votes
1answer
315 views

Why isn't there a simple syntax for coproduct types in Haskell?

Product types in Haskell are easily definable: data Person String String is a product of two types. The coproduct of two types is type Shape=Either Circle Rectangle But whereas the product is ...
8
votes
1answer
463 views

Composition of two functors is a functor

In a previous answer, Petr Pudlak defined the CFunctor class, for functors other than those from Hask to Hask. Re-writing it a bit using type families, it looks like class CFunctor f where type Dom ...
13
votes
2answers
400 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 ...
24
votes
3answers
717 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 ...
7
votes
2answers
208 views

What means precisely “function inside a functor”

In category theory functor is a homomorphism between two categories. In Haskell, it's said that applicative functor allows us to apply functions "inside a functor". Could one translate that words ...
11
votes
1answer
436 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 ...
2
votes
0answers
43 views

Complexity of Equivalence of Categories

I'm trying to find a characterization of the computational complexity of the equivalence problem for finitely presented categories. Given two categories C and D, an equivalence is two functors F : ...
5
votes
1answer
270 views

Understanding Sequencing in Functional Programming

I'm mostly a practical guy but I find this interesting. I have been thinking about monadic sequencing and there are a few things that I need clarified. So at the risk of sounding silly here it is: ...
12
votes
2answers
380 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 ...
6
votes
1answer
221 views

How to define equality for Category instances?

In order to prove that for instance the Category laws hold for some operations on a data type, how do one decide how to define equality? Considering the following type for representing boolean ...
4
votes
3answers
191 views

Satisfying monad laws without a type constructor

Given e.g. a type like data Tree a = Branch (Tree a) (Tree a) | Leaf a I can easily write instances for Functor, Applicative, Monad, etc. But if the "contained" type is predetermined, ...
12
votes
3answers
819 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 ...
16
votes
1answer
573 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 ...
1
vote
1answer
120 views

Contravariant binary operations in Scala

For a very basic generic model of categories, I'm trying to get the morphism associated with a pair of objects in a contravariant fashion. class Obj[DerivedObj <: Obj[DerivedObj]] { /* ... */ } ...
7
votes
2answers
993 views

What's the relation of fold on Option, Either etc and fold on Traversable?

Scalaz provides a method named fold for various ADTs such as Boolean, Option[_], Validation[_, _], Either[_, _] etc. This method basically takes functions corresponding to all possible cases for that ...
39
votes
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 ...
7
votes
3answers
796 views

Scala — How to use Functors on non-Function types?

While reading the description of Functors on this blog: https://hseeberger.wordpress.com/2010/11/25/introduction-to-category-theory-in-scala/ there is a generic definition of Functor and a more ...
23
votes
1answer
814 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 ...