# Questions tagged [category-theory]

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 programs themselves. Various category theoretic structures are used as tools for abstraction in programming, including functors, monads, and algebras.

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### Recursion scheme allowing dependencies between recursive calls (an ordered catamorphism?)

I'm interested in a higher-order way (recursion scheme) to write recursive code in which there might be dependencies between recursive calls.
As a simplified example, consider a function that ...

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### Category Theory fundamentals

I am looking for references on Category Theory that
are mature (== at least 5 years old)
at a level of university education (not post-doctorate, ultra symbolic introductions)
start from the basics (...

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### Meaning of ⊗ applied to morphisms

I think I understand what ⊗ means when applied to objects (such as M ⊗ M), but what does it mean when applied to morphisms (such as η⊗1). Is it just composition?

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### Understanding of bifunctor from Category Theory for Programmers - Ch. 8

I'm going mental with Chapter 8 from Category Theory for Programmers.
In section 8.3, Bartosz defines this type
newtype BiComp bf fu gu a b = BiComp (bf (fu a) (gu b))
Here, if I'm understanding a ...

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### Functors and natural transformations

If F is a functor linking category C to category D, and G is a functor linking category C to category E,(and assuming that both functors are bijections), does this imply that there is a unique natural ...

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### What subclasses of `Profunctor` does `FunList` support?

A FunList is a datatype invented by Twan van Laarhoven in this blog post. A minor variation given by Bartosz Milewski looks like this:
data FunList a b t = Done t
| More a (FunList ...

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### What is the 'minimum' needed to make an Applicative a Monad?

The Monad typeclass can be defined in terms of return and (>>=). However, if we already have a Functor instance for some type constructor f, then this definition is sort of 'more than we need' ...

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### How can we build explicit categories in Haskell?

Corresponding with the mathematical idea of a category, Haskell has a Category typeclass. I'd like to build some small finite categories and work with them, along the lines of the book Computational ...

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### Difference between initial and terminal objects in a category

Bartosz Milewski, in the section Terminal Object of Chapter 5 underlines the following
Notice that in this example the uniqueness condition is crucial, because there are other sets (actually, all of ...

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### All arrows in a category only containing Bool Unit and Void

It's actually the challenge #6 from Category Theory for Programmers - Chapter 2, and this question is a follow up on this other question I asked some time ago:
Draw a picture of a category whose only ...

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### Is an identity functor in Category of sets a function application?

https://ncatlab.org/nlab/show/identity+functor
The identity functor on a category C is the functor idC:C→C that maps
each object and morphism of C to itself. The identity functors are the
identities ...

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### If Either can be either Left or Right but not both, then why does it correspond to OR instead of XOR in Curry-Howard correspondence?

When I asked this question, one of the answers, now deleted, was suggesting that the type Either corresponds to XOR, rather than OR, in the Curry-Howard correspondence, because it cannot be Left and ...

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### What type corresponds to a xor b in type theory?

At the end of Category Theory 8.2, Bartosz Milewski shows some examples of the correspondence between logic, category theory, and type systems.
I was wandering what corresponds to the logical xor ...

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### Equivalence relations are to Groups, as partial order relations are to…?

I'm a beginning student of category theory so the question is a little hazy. Apologies if it is too basic.
An equivalence relation induces a "symmetric category" (bad terminology?), where ...

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### Why can't I find any law violations for the NotQuiteCofree not-quite-comonad?

On Twitter, Chris Penner suggested an interesting comonad instance for "maps augmented with a default value". The relevant type constructor and instance are transcribed here (with cosmetic ...

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### Is Last a free monoid?

The free monoids are often being regarded as "list monoids". Yet, I am interested in other possible structures which might give us free monoids.
Firstly, let us go over the definition of ...

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### What's a functor on the category of monads?

Note, this question is not about "monoids in the category of endofunctors". Nor is it directly about Functors (a Monad is always a Functor, but this question is concerned mainly about monad ...

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### How many different functions are there from Bool to Bool?

Since this is (at least it seems to me) tightly related to programming, I'm asking here rather than on math or cs, but if you it think it best fits there or in another side, please just give your ...

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### Initial algebra for natural numbers

I'm trying to make sure I understand the initial algebra and catamorphism concept using the basic case of natural numbers, but I'm definitely missing something (also my Haskell syntax might be a mess)....

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### “Category laws” in Haskell wiki

According to Haskell wiki,
https://en.wikibooks.org/wiki/Haskell/Category_theory#Category_laws
Category laws
There are three laws that categories need to follow. Firstly, and most simply, the ...

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### How is `arr fst` a natural transformation?

I asked this question a while ago. It was about the following arrow law:
arr fst . first f = f . arr fst -- (.) :: Category k => k b c -> k a b -> k a c
In the comments under the post Asad ...

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### Is there any general functor (not limited to endofunctor) usage in programming? [closed]

Is there any general functor (not limited to endofunctor) usage in programming?
I understand the reason endofunctor employed is to make the structure simple like monoid or monad.
I also understand ...

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### Haskell functor implementation dealing with “BOX”?

In Category theory, Functor concept is as the below:
https://ncatlab.org/nlab/show/functor
In Haskell, Functor type can be expressed as:
fmap :: (a -> b) -> f a -> f b
https://hackage....

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### Functor implementation in JavaScript

I try to implement a Functor in JavaScript.
A diagram of definition to the Functor is as follows:
or in nLab
https://ncatlab.org/nlab/show/functor
Here, as you see F(f) expression looks typical in ...

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### define Category in which arrows are parametrised functions using Coq

Coq is version 8.10.2 and I use category-theory library made by jwiegley.
I want to define Category whose objects are Euclidean spaces and arrows are Parametrised function (P -> A -> B) between ...

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### Can we think of non-symmetric product data types in Haskell?

Control.Category.Constrained.Cartesian is a class for monoidal categories with some natural transformations (the product is (,) and the unit defaults to (); the product cannot be changed, unlike the ...

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### Does Pointed for categories embody well-pointed categories?

In this post leftaroundabout speaks of well-pointed categories. In the post, the WellPointed class is a subclass of Category, unlike Control.Arrow.Constrained.WellPointed (the reasons for this we ...

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### WellPointed for dual to PreArrow class

In Control.Arrow.Constrained there is a class WellPointed:
Unlike with Morphism and PreArrow, a literal dual of WellPointed does not seem useful.
Which is true as the duality for the following ...

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### Is Void an initial or zero element?

ZeroObject of Control.Category.Constrained defaults to Void. It is obvious that Void is an initial object:
{-# LANGUAGE EmptyCase #-}
absurd :: Void -> a
absurd x = case x of
But why is it called ...

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### Why is it fair to think of just locally small cartesian closed categories in Haskell for the Curry class?

Control.Category.Constrained is a very interesting project that presents the class for cartesian closed categories - Curry.
Yet, I do not see why we think of all cartesian closed categories which ...

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### Why are Monoidal and Applicative laws telling us the same thing?

I have learnt about Monoidal being an alternative way to represent Applicative not so long ago. There is an interesting question on Typeclassopedia:
(Tricky) Prove that given your implementations ...

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### Compositional batching using functional constructs

I am trying to create a compositional batching mechanism.
The process flow must be.
Accumulate the state in the form of s: Map[BatchFragmentId, FragmentRequest]
Compute the result in the form of Map[...

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### Why do Static Arrows generalise Arrows?

It is widely known that Applicative generalises Arrows. In the Idioms are oblivious, arrows are meticulous, monads are promiscuous paper by Sam Lindley, Philip Wadler and Jeremy Yallop it is said that ...

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### Category theory to Computer Programming | Do objects map to Types or instances of Types?

The building blocks of Category theory are defined by objects and arrows.
If arrows can be seen as programming language's functions; do objects map to Types; or an instance of a Type ... or "...

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### Why is ArrowApply an only option when proving equivalence with Monads?

Under this question, leftarounabout left a pretty clear explanation why we actually consider ArrowApply and Monad equivalent.
The idea is in not losing any information during round trips:
...

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### Type constructor parameter inference

I'm going through "Scala with cats". In 3.5.2 (p. 58, bottom) there is an example:
def doMath[F[_]](start: F[Int])(implicit functor: Functor[F]): F[Int] =
start.map(n => n + 1 * 2)
...

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### Is it possible to write join down for Arrows, not ArrowApply?

I tried writing down joinArr :: ??? a => a r (a r b) -> a r b.
I came up with a solution which uses app, therefore narrowing the a down to ArrowApply's:
joinArr :: ArrowApply a => a r (a r b) ...

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### The intuition behind the definition of the co-reader monad

In https://hackage.haskell.org/package/category-extras-0.53.0/docs/Control-Comonad-Reader.html, the co-reader monad is defined, and the co-monadic type modality applies to a type a and generates a ...

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### Why can't ghc match these types on this Category product?

I have a pretty typical definition of a category as such:
class Category (cat :: k -> k -> Type) where
id :: cat a a
(.) :: cat a b -> cat c a -> cat c b
Now I would like to make the ...

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### Disambiguating a Lax Monoidal Functor

I am trying to make a lax monoidal functor (Haskell's Applicative) that is as true to category theory as possible. Mostly as an exercise to practice categorical thinking. I've already made a few ...

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### How to do Left Void?

I am trying to understand https://hackage.haskell.org/package/base-4.14.0.0/docs/Data-Void.html and having the following example:
let x :: Either Void Int; x = Left Void
The code does not get ...

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### Natural Tranformation in a More General Context

I've been building my way up through some category theory in Haskell on my way to creating more general Monads.
Before I can move onto the next step I am going to need to be able to work with natural ...

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### How to it is a natural transformation?

I am going to use the wonderful library https://tpolecat.github.io/doobie/ and it is fully functional.
I was going through the first example and I have recognized:
A Transactor is a data type ...

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### List coalgebra translating code from Haskell to SML

I'm trying to translate this piece of code in Haskell that describes List anamorphism but can't quite get it to work.
The final three lines are supposed to generate a function count which given an ...

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### Is the name of `liftM` inspired by lifts in mathematics? [closed]

I'm a math PhD student minoring in CS and currently taking a class in Haskell. We just learned about liftM.
The concepts seem similar but I haven't been able to figure out exactly how liftM can be ...

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### Is it possible to generalize this lmap

I would like to generalize the bifunctor lmap a bit.
lmap normally takes a function and maps it across the left functor in a bifunctor.
To start I generalize the idea of Functor to categories beyond ...

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### Are there two functors between which no natural transformation exists?

I have a Task, which is basically a continuation type with an incorporated error case and Optional, which represents computations that may not yield a result.
There seems to be a natural ...

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### Having trouble translating code from Haskell to SML

I am trying to translate the following piece of code from SML to haskell but I'm having a bit of trouble.
type List_alg x u = (u, x->u->u)
list_cata :: List_alg x u -> [x] -> u list_cata ...

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### Identity function in Haskell has multiple inhabitants?

In category theory it can be proven that the identity function is unique. It is also said that, reasoning with parametricity, that the type forall a. a -> a has only one inhabitant. In Haskell ...

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### Is there a non-identity monad morphism M ~> M that is monadically natural in M?

It is known that natural transformations with type signature a -> a must be identity functions. This follows from the Yoneda lemma but can be also derived directly. This question asks for the same ...