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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Do monad transformers, generally speaking, arise out of adjunctions?

In Adjoint functors determine monad transformers, but where's lift?, Simon C has shown us the construction... newtype Three u f m a = Three { getThree :: u (m (f a)) } ... which, as the answers ...
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Simple encoding of category of sets and functions in Agda

This is a very basic question on Agda and Category Theory. I want to encode a category where objects are finite sets and arrows are functions between them. I'm using the agda/agda-categories repo for ...
11
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1answer
371 views

Use cases for adjunctions in Haskell

I have been reading up on adjunctions during the last couple of days. While I start to understand their importance from a theoretical point of view, I wonder how and why people use them in Haskell. ...
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4answers
175 views

What is partial order?

I am reading category theory for programmers from Bartosz Milewski and I did not get the idea of partial order. I did not get the context of the following sentences: You can also have a stronger ...
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1answer
85 views

Attach extra information at every level of a recursive data type?

(This is not specifically a Haskell question.) I have a recursive data structure. I would like to attach some kind of extra information at every level of it. Here's a simplified example, in which I'm ...
9
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1answer
148 views

Defining Free Bind in a way that is compatible with the Free Monad

So we have the free monad: (encoding may vary, but they're all the same) data Free f a = Pure a | Impure (f (Free f a)) instance Functor f => Monad (Free f) where pure = Pure ...
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5answers
976 views

Example of non-trivial functors

In Haskell, functors can almost always be derived, is there any case where a type is a functor and satisfies functor laws (such as fmap id == id) but cannot be derived according to a simple set of ...
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2answers
187 views

What is the relationship between bind and join?

I got the impression that (>>=) (used by Haskell) and join (preferred by mathematicians) are "equal" since one can write one in terms of the other: import Control.Monad (join) join x = x >&...
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1answer
275 views

Don't understand notation of morphisms in Monoid definition

I'm trying to understand what Monoid is from a category theory perspective, but I'm a bit confused with the notation used to describe it. Here is Wikipedia: In category theory, a monoid (or monoid ...
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97 views

Understanding Curry-Howard Isomorphism exercise from Thinking With Types

I've begun reading the book Thinking With Types which is my first foray into type level programming. The author provides an exercise and the solution, and I cannot understand how the solution provided ...
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3answers
313 views

What does “a monad is a model of computation” mean

What does it mean exactly when people say "a monad is a model of computation"? Does this mean computation in the sense of turing completeness? If so, how? Clarification: This question is not about ...
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3answers
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Understanding the diagrams of Product and Coproduct

I am trying to understand the Product and Coproduct corresponding to the following picture: Product: Coproduct: As I understand, a Product type in Haskell is for example: data Pair = P Int ...
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3answers
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What is monoid homomorphism exactly?

I've read about monoid homomorphism from Monoid Morphisms, Products, and Coproducts and could not understand 100%. The author says (emphasis original): The length function maps from String to ...
6
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1answer
127 views

Free Monad for AST > 1-arity?

When I'm saying 1-arity | 2-arity | n-arity, I'm referring to tree in grap theory k-ary tree : a k-ary tree is a rooted tree in which each node has no more than k children I have been using Free ...
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2answers
142 views

meaning of `<>` in this family `<*>,<$>,<&>`

I'm Trying to expand my understanding about symbols in Haskell : $ : Function Application operator (Allow you to apply arguments over a function) & : flipped version of Function Application ...
4
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1answer
71 views

MonoidK and Monad relation

I'm trying to understand well known phrase A monad is just a monoid in the category of endofunctors and map some category theory concepts to cats library. There is a MonoidK typeclass in cats and it'...
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1answer
191 views

Does * in (<*>) have a special meaning?

Trying to expand my understanding about symbols in Haskell : ($) : Function Application operator (Allow you to apply arguments over a function) (&) : flipped version of Function Application ...
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173 views

Adjunction underlying the Tardis monad

We know that monads come from adjunctions (and this was discussed on SO too). The usual monads in programming use come from well-known adjunctions. So where does the Tardis monad come from? (RevState ...
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1answer
19 views

Is unique morphism `m` which maps “best” product type to “suboptimal” product type truly unique?

I'm working through Bartosz Milewski's awesome blogs about category theory. I'm stuck on the one on products and coproducts. Bartosz says that a product of two objects a and b is the object c ...
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2answers
91 views

Generalization of strong and closed profunctors

I was looking at the classes of strong and closed profunctors: class Profunctor p where dimap :: (a' -> a) -> (b -> b') -> p a b -> p a' b' class Profunctor p => Strong p where ...
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1answer
26 views

Confusion in understanding horisontal composition of natural transformations

I'm currently reading Category Theory for Programmers by Bartosz Milewski. In chapter about natural transformation i found a following paragraph: Let’s focus on two objects of 𝐂𝐚𝐭 — categories 𝐂...
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1answer
67 views

How to create an fmap that can take a tuple of functions instead of just a single function?

This could be a way of constructing Is there a (ideally standard) way of accomplishing f :: Int -> Int f x = 2*x g :: Int -> String g x = show x h = (f, g) fmap h 5 -- results in: (10, "...
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1answer
275 views

What is Representable used for in Haskell?

I am looking to understand what does Representable stand for in Haskell. The definition Representable endofunctors over the category of Haskell types are isomorphic to the reader monad and so ...
9
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4answers
315 views

What is the main difference between Free Monoid and Monoid?

Looks like I have a pretty clear understanding what a Monoid is in Haskell, but last time I heard about something called a free monoid. What is a free monoid and how does it relate to a monoid? Can ...
3
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3answers
229 views

Monad composition (Cont · State)

I'm studying monad composition. While I already understand how to compose, say, Async and Result as performed here I'm struggling in composing the Continuation Monad and the State Monad. Starting ...
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2answers
118 views

Every monad is an applicative functor — generalizing to other categories

I can readily enough define general Functor and Monad classes in Haskell: class (Category s, Category t) => Functor s t f where map :: s a b -> t (f a) (f b) class Functor s s m => ...
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4answers
222 views

`(a -> b) -> (c -> d)` in Haskell?

This is yet another Haskell-through-category-theory question. Let's take something simple and well-known as an example. fmap? So fmap :: (a -> b) -> f a -> f b, omitting the fact that f is ...
6
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3answers
306 views

Why is there a distinction between co and contravariant functors in Haskell but not Category Theory?

This answer from a Category Theory perspective includes the following statement: ...the truth is that there's no real distinction between co and contravariant functor, because every functor is just ...
7
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3answers
180 views

How does compiler figure out fixed point of a functor and how cata work at leaf level?

I feel like understanding the abstract concept of fixed point of a functor, however, I am still struggling to figure out the exact implementation of it and its catamorphism in Haskell. For example, ...
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0answers
161 views

Is there a common name for this generalization of monads?

In Haskell, we think of a monad m as being a (Hask endo-)functor equipped with the following structure: pure : a -> m a bind : (a -> m b) -> (m a -> m b) This is by contrast to the more ...
7
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2answers
166 views

Do the monadic liftM and the functorial fmap have to be equivalent?

(Note: I'm phrasing the question using Haskell terminology; answers are welcome to use the same terminology and/or the mathematical language of category theory, including proper mathematical ...
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1answer
382 views

Monads not with “flatMap” but “flatUnit”? [closed]

Monads in category theory is defined by triples T, unit, flat⟩. class Monad t where map :: (a -> b) -> (t a -> t b) -- functorial action unit :: a -> t a flat :: t (t a) -> t a ...
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115 views

A categorical view on applicative containers

This answer from Conor McBride (pigworker) discusses Applicative functors that are also containers (data types given by a set of shapes and a family of positions). Among other things, he mentions that:...
16
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1answer
239 views

What does “lax” mean in “lax monoidal functor”?

I know that the Applicative class is described in category theory as a "lax monoidal functor" but I've never heard the term "lax" before, and the nlab page on lax functor a bunch of stuff I don't ...
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144 views

Why does the Functor class in Haskell not include a function on objects? Is `pure` that function? [duplicate]

In Category theory, it is very conspicuous that a definition of a functor should include two functions: on objects and on arrows. However, the usual Haskell Prelude.Functor does not make any mention ...
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1answer
37 views

retract in an abstract category.

Suppose I have a category $C$ and a morphism $f: a\rightarrow b$ in this category. Suppose that the induced map $f^{\ast}:Hom_{C}(a,a)\rightarrow Hom_{C}(b,a)$ induces a bijection of sets. Is it true ...
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0answers
119 views

functional programming terminology: lifting vs functor/applicative lifting

I'm writing a functional programming library and I'm trying to decide which name is best for a series of functions. The functions all take a function and return another function. The returned ...
5
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1answer
224 views

Is Behavior a Comonad?

Conal Elliott talks about Streams and Comonads here: http://conal.net/blog/posts/sequences-streams-and-segments However, he doesn't mention Behavior directly. So.. is Behavior a Comonad, and if so - ...
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1answer
186 views

Why do initial algebras correspond to data and final coalgebras to codata?

If I understand correctly, we can model inductive data types as initial F-algebras and co-inductive data types as final F-coalgebras (for an appropriate endofunctor F) [1]. I understand that according ...
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2answers
127 views

Why is this type annotation wrong?

I tried to follow the article by Gabriel Gonzalez and I ran into a type mismatch. Consider the following short module: {-# LANGUAGE DeriveFunctor #-} {-# LANGUAGE Rank2Types #-} module Yoneda where ...
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3answers
511 views

What is the purpose of `pure` in Applicative Functor

Meet the Applicative typeclass. It lies in the Control.Applicative module and it defines two methods, pure and <*>. It doesn't provide a default implementation for any of them, so we have to ...
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1answer
68 views

What does the map function in the Applicative from Category theory do?

Given the following statement about functional programming - in particular reasoning about category theory - we see the map function inside the Applicative. trait Applicative[F[_]] extends Functor[F] ...
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2answers
276 views

Where is the bifunctor for functions in haskell?

I can't find bifunctor analog of fmap. Explanation: Functor for objects - datatype constructor. Type - a -> f a Functor for functions - fmap. Type - (a -> b) -> (fa -> fb) Bifunctor ...
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0answers
122 views

Does Hask form a theoretically valid category? Or it just pretends to be one?

Hask looks like a subcategory of the SET - category of all sets and single-argument functions between them. However, seems like it fails to preserve id when it comes down to the undefined: seq ...
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2answers
110 views

Are List Int and List String the same category in Haskell/Category theory?

Are List Int and List String the same category in Haskell/Category theory? List Int List String Both are List. Are they considered the same category? Thanks.
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0answers
113 views

How to get around conflicting type family instance declarations

I am attempting to make kind polymorphic category theory ala Edward Kmett's Hask. When attempting to translate and modernize Functor Composition I am running into a problem where GHC thinks type ...
2
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1answer
215 views

what's the theoretical definition of a function in Haskell

I'd like to see, from the foundations point of view, what are called functions in Haskell. See, categorically, there are "things" that compose associatively, with an identity function, and that would ...
3
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1answer
164 views

Forgetting Cofree annotations using a catamorphism

I have an AST that I'm annotating using Cofree: data ExprF a = Const Int | Add a a | Mul a a deriving (Show, Eq, Functor) I use type Expr = Fix ExprF to represent untagged ...
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1answer
72 views

Is there a reason that `Functor` is not a superclass of `Category`?

It seems you can simply declare: import qualified Control.Category as Cat instance Cat.Category q => Functor (q r) where fmap = (Cat..) Is there anything speaking against this?
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How to undestand functors in the Nix expression language?

I'm having a bit of trouble parsing this. But as I write it out, I think I may have it. let add = { __functor = self: x: x + self.x; }; inc = add // { x = 1; }; in inc 1 First, is self a keyword ...