# Tagged Questions

*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 canonical name for the identity type?

I recently answered a question here: How do I express this in Typescript? Here's the snippet of code from the above: trait FooBar[M[_]] { val foo: M[Integer] val bar: M[String] } type ...
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### Why must fmap map every element of a List?

Having read the book Learn you a Haskell For Great Good, and the very helpful wiki book article Haskell Category Theory which helped me overcome the common category mistake of confusing category ...
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### What are some types that discriminate between categories?

I'm still getting familiar with all this category theory stuff, and just about every example I see is with a Maybe or an Array. But I haven't found any examples that discriminate between these ...
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### Is there a type class for singleton Apply[A]

What is a typeclass for something like this: trait SingletonApply[A <: AnyRef] { def apply(x: A): x.type } Is there something like this already in Cats or Scalaz?
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### Clojure cats append nil behaviour

I am using funcool/cats, append monoid with the following code : (m/mappend (maybe/just [1 2 3]) nil (maybe/just [4 5 6]) (maybe/nothing)) ;;=> #<Just [1 ...
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### What does a “monadic structure” and “element of a structure” precisely mean in the context of arbitrary Monad?

Reading through the documentation of Control.Monad I found such description of mapM: Map each element of a structure to a monadic action, evaluate these actions from left to right, and collect the ...
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### Monad: Why does Identity matter, what's going to happen if there's no such special member in a set?

I'm trying to learn the concept of monad, I'm watching this excellent video Brian Beckend trying to explain what is monad. When he talks about monoid, it's a collection of types, it has a rule of ...
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### Confusing map function definition in Wadler's paper

Can someone please help me understand this map definition in Professor Wadler's original paper Monads for Functional Programming (Haskell). map :: (a → b) →(M a →M b) map f m =m >= ...
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### What is Applicative Functor definition from the category theory POV?

I was able to map Functor's definition from category theory to Haskell's definition in the following way: since objects of Hask are types, the functor F maps every type a of Hask to the new type F a ...
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### Free monad and the free operation

One way to describe the Free monad is to say it is an initial monoid in the category of endofunctors (of some category C) whose objects are the endofunctors from C to C, arrows are the natural ...
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### 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 ...
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### Is it possible to prove the existence of the category of categories (with functors as morphisms) in Agda without functional extensionality?

I am modelling categories and functors like this (the imports are from the standard library): module Categories where open import Level open import Relation.Binary.PropositionalEquality record ...
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### Is monad bind (>>=) operator closer to function composition (chaining) or function application?

In many articles I have read that monad >>= operator is a way to represent function composition. But for me it is closer to some kind of advanced function application (\$) :: (a -> b) -> ...
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### The useful application of Functor's Product and Coproduct

Could you show a simple code example which would display the useful application of Data.Functor's Product and Coproduct?
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### Type classes with laws that contain not equalities/symmetries but inequalities/asymmetries

All of the type classes that I've come across, I think have had laws that establish symmetries by specifying equations. I was wondering though if there are any prominent theoretical or even practical ...
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### Why is `pure` only required for Applicative and not already for Functor?

Reading this Wikibook about Haskell and Category Theory basics, I learn about Functors: A functor is essentially a transformation between categories, so given categories C and D, a functor F : C ...
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### Is this a meaningful generalization of `scan`s for arbitrary ADTs?

I've been thinking how one could generalize scanl to arbitrary ADTs. The Prelude approach is just to treat everything as a list (i.e., Foldable) and apply the scanl on the flatened view of the ...
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### Is Monoid[String] really a Monoid in scala

I am currently learning about category theory in scala and the law of associativity says (x + y) + z = x + (y + z) Thats just fine when working with more than two values ("Foo" + "Bar") + ...
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### 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 ...
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### resource that explains vocabulary used in Edward Kmett's lens package

I am trying to read the documentation in Edward Kmett's Lens package. I am not familiar with a lot of the terms used (profunctor, isomorphism, monomorphic, contravariant, bifunctor, etc...) What ...
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### Issues Generalising Functor

Functor in Control.Categorical.Functor has the following definition: class (Category r, Category t) => Functor f r t | f r -> t, f t -> r where fmap :: r a b -> t (f a) (f b) But lets ...
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### Typeclass for (what seems to be) a contravariant functor implementing function inversion

Lets say I have the following import Control.Category (Category, (.), id) data Invertible a b = Invertible (a -> b) (b -> a) instance Category Invertible where id = Invertible Prelude.id ...
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### 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 ...
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### Is a state monad with two state variable types (in and out) still a monad?

Haskell's state monad State s a forces me to keep the same type of s during the whole do block. But since the state monad is really just a function, what if I define it as State i o a = State (i -> ...
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### Is there any intuition to understand join two functions in Monad?

join is defined along with bind to flatten the combined data structure into single structure. From type system view, (+) 7 :: Num a => a -> a could be considered as a Functor, (+) :: Num a ...
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In this answer to "Can a monad be a comonad?" we see that Every Cofree Comonad over an Alternative functor yields a Monad. What would be the dual to this? Is there a class of functors that ...
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### 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 ...
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### 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 ...
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### Can I implement this newtype as a composition of other types?

I've written a newtype Const3 that's very similar to Const, but contains the first of three given type arguments: newtype Const3 a b c = Const3 { getConst3 :: a } I can define very many useful ...
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### Arrow notation in slice category

If CatC is a category and A any object of CatC, the slice category CatC/A is described this way: SC-1 An object of CatC/A is an arrow f: C -> A of CatC for some object C. SC-2 An arrow ...
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### Arrows in the definition of dual of category

Given any category CatC, you can construct another category denoted CatCop by reversing all the arrows. The dual or opposite CatCop of a category CatC is defined by: D-1 The objects and arrows ...
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### 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 ...
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### Is (\f -> fmap f id) always equivalent to arr?

Some instances of Category are also instances of Functor. For example: {-# LANGUAGE ExistentialQuantification, TupleSections #-} import Prelude hiding (id, (.)) import Control.Category import ...
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### 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 ...
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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 ...
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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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### 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 ...
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### 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. ...
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### 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 ...
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### 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 ...
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When it comes to applying category theory for generic programming Haskell does a very good job, for instance with libraries like recursion-schemes. However one thing I'm not sure of is how to create a ...
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### 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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### 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 ...
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### 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 ...
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### 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 ... ...
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### 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 ...