Dark mode beta

You’ve been asking for dark mode for years.
The dark mode beta is finally here.

Change your preferences any time.

Questions tagged [fixpoint-combinators]

Questions about fixed-point combinators, used to encode recursion. For fixed-point arithmetic, use [fixed-point] instead. For the numerical method, used [fixed-point-iteration] instead.

Filter by
Sorted by
Tagged with
9
votes
1answer
148 views

Fix and Mu isomorphic

In the recursion-schemes package the following types are defined: newtype Fix f = Fix (f (Fix f)) newtype Mu f = Mu (forall a. (f a -> a) -> a) Are they isomorphic? If so, how do you prove it?...
5
votes
2answers
144 views

How the type `Fix` and function `fix` are same in Haskell?

I'm trying to convince myself that type Fix and function fix are same thing. But I can't find the correlation between their definitions -- definition of fix fix :: (p -> p) -> p fix f = let {x ...
2
votes
1answer
93 views

Can fix be tail recursive and thus expressed as a simple loop?

I can't figure out how to express fix as a tail recursive algorithm. Or is it already tail recursive? I am probably overthinking it... const fix = f => x => f(fix(f)) (x); // redundant eta ...
2
votes
1answer
75 views

fix-point combinators in clojure

One of my favorite ways to test the power of a language I'm learning is to try and implement various fixed-point combinators. Since I'm learning Clojure (though I'm not new to lisps), I did the same ...
1
vote
1answer
97 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 ...
-1
votes
1answer
148 views

Haskell List function (map, zip, etc..) with fix

I try to learn haskell and have exercise -try to rewrite standart list operation(map, foldr, zip, iterate, etc.) with function fix. I have example with repeat: repeat a = fix $ \xs -> a : xs and ...
7
votes
3answers
285 views

Sharing vs. non-sharing fixed-point combinator

This is the usual definition of the fixed-point combinator in Haskell: fix :: (a -> a) -> a fix f = let x = f x in x On https://wiki.haskell.org/Prime_numbers, they define a different fixed-...
1
vote
3answers
152 views

a fixed point for fix :: Eq a => (a -> a) -> a -> a

Hello everyone I'm trying to implement the higher-order function fix, which computes an attractive fixed point of an arbitrary function f :: a -> a from an initial point x. That is, a fixed point ...
7
votes
3answers
250 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, ...
2
votes
1answer
142 views

How to understand/use Haskell fix function [duplicate]

I see the following code in xmonad package: -- | Ignore SIGPIPE to avoid termination when a pipe is full, and SIGCHLD to -- avoid zombie processes, and clean up any extant zombie processes. ...
7
votes
1answer
177 views

fix vs. ArrowLoop

Description of loop from Control.Arrow: The loop operator expresses computations in which an output value is fed back as input, although the computation occurs only once. It underlies the rec value ...
5
votes
1answer
431 views

Least fix point, greatest fix point

How come the least fix point coincides with the greatest fix point in a lazy non-total language like Haskell. What does continuity on complete partial orders have to do with that?
7
votes
1answer
156 views

Is mfix for Maybe impossible to be nontrivially total?

Since Nothing >>= f = Nothing for every f, the following trivial definition is suitable for mfix: mfix _ = Nothing But this has no practical use, so we have the following nontotal definition: ...
0
votes
3answers
162 views

How to write a Show instance for Mu recursive types

I want to write an instance of Show for lists of the following type: newtype Mu f = Mu (forall a. (f a -> a) -> a) data ListF a r = Nil | Cons a r deriving (Show) type List a = Mu (ListF a) ...
0
votes
3answers
174 views

Y-combinator does not seem to have any effect

I tried using the y-combinator (in both Lua and Clojure) as I thought that would allow me to exceed the size of default stack implementations when using recursion. It seems I was mistaken. Yes, it ...
2
votes
1answer
144 views

Define lists with least fixed point, sum, and product types

I want to define lists using only this type definitions: data Unit = Unit data Prod a b = P a b data Sum a b = L a | R b newtype Mu f = Mu (forall a . (f a -> a) -> a) I succeeded defining ...
5
votes
1answer
209 views

Haskell AST Annotation with Fix

I am working on creating an AST in Haskell. I want to add different annotations, such as types and location information, so I ended up using fixplate. However, I can't find any examples online and am ...
1
vote
1answer
78 views

Delaying Evaluation with Abstractions in the Y-Combinator

I am having some problem wrapping my head around how evaluation delaying works. I am trying to understand it with the Y-Combinator: If we write a simple version of the Y-Combinator we get problems ...
2
votes
1answer
82 views

Can one express catamorphism through Data.Function.fix?

I have this lovely fixana function here that performs about 5 times faster than her sister ana. (i have a criterion report to back me on this) ana alg = Fix . fmap (ana alg) . alg fixana alg = fix $ ...
3
votes
2answers
227 views

Can fix only be typed in non-strict evaluated languages?

I write a runtime type checker in and for Javascript and have trouble to type fix: fix :: (a -> a) -> a fix f = ... fix (\rec n -> if n == 0 then 1 else n * rec (n-1)) 5 -- 120 The ...
9
votes
1answer
1k views

Understanding the Fix datatype in Haskell

In this article about the Free Monads in Haskell we are given a Toy datatype defined by: data Toy b next = Output b next | Bell next | Done Fix is defined as follows: data Fix f = Fix (f (...
25
votes
1answer
2k views

What is the difference between Fix, Mu and Nu in Ed Kmett's recursion scheme package

In Ed Kmett's recursion-scheme package, there are three declarations: newtype Fix f = Fix (f (Fix f)) newtype Mu f = Mu (forall a. (f a -> a) -> a) data Nu f where Nu :: (a -> f a) ->...
2
votes
2answers
440 views

How to use Functor instances with Fix types

Let's say I want to have a very generic ListF data type: {-# LANGUAGE GADTs, DataKinds #-} data ListF :: * -> * -> * where Nil :: List a b Cons :: a -> b -> List a b Now ...
3
votes
1answer
192 views

Using Comonad Fix Combinators

So I've been experimenting with fixed points lately and have finally struggled through regular fixed points enough to discover some uses; now I'm moving onto comonadic fixed points and I'm afraid I've ...
2
votes
2answers
414 views

How McCarthy 91 function works

I have following function based on McCarthy 91 principle: mc91 :: Integer -> Integer mc91 n | n > 100 = n - 10 | otherwise = mc91 (mc91 (n + 11)) when I type in the prelude mc91 85 I'...
5
votes
1answer
423 views

Haskell: deriving Show for Fix types

I'm trying to implement a recursive datatype using recursion-schemes. I would like to be able to print it. import Data.Functor.Foldable data T1F a = Foo deriving Show type T1 = Fix T1F data T2 = Bar ...
5
votes
2answers
400 views

Recursion schemes using `Fix` on a data-type that's already a Functor?

Still working on my text editor Rasa. At the moment I'm building out the system for tracking viewports/splits (similar to vim splits). It seemed natural to me to represent this structure as a tree: ...
13
votes
2answers
499 views

The fixed point functors of Free and Cofree

To make that clear, I'm not talking about how the free monad looks a lot like a fixpoint combinator applied to a functor, i.e. how Free f is basically a fixed point of f. (Not that this isn't ...
1
vote
2answers
167 views

Haskell school of expression fix function [duplicate]

So I am reading Paul Hudak's book "The Haskell School of Expression" and am stuck on an exercise in there. Here it goes Suppose function fix is defined as fix f = f (fix f) What is the principal ...
6
votes
1answer
115 views

Why does haskell's `fix` seem to have trouble with tuples?

I'm trying to bend my head around fixed points and recursive definitions. This works: >>> take 10 $ let x = (0:x) in x [0,0,0,0,0,0,0,0,0,0] This does the same thing, which makes sense ...
0
votes
1answer
188 views

Find least fixpoint of a function

If I have this Haskell function: Consider the following Haskell function f : f :: Int -> Int f 0 = 1 f x = x * x * f (x - 1) Then how can I calculate its fixpoint and the least fixpoint (in ...
6
votes
1answer
335 views

How to use Y- Combinator; why does this infinite recursion return 9?

Y - Combinator I've been trying to learn about Y - Combinators (an explanation on that would be lovely as well) and came across an example from this wiki. An in depth explanation on the subject ...
19
votes
3answers
1k views

Why is this version of 'fix' more efficient in Haskell?

In Haskell, this is a simple (naive) definition of a fixed point fix :: (a -> a) -> a fix f = f (fix f) But, here is how Haskell actually implements it (more efficient) fix f = let x = f x in ...
1
vote
1answer
83 views

Guessing the type of fixed-point combinator

My question is related to "fixed point combinator". According to this Wikipedia page section a function fix such that fix f = f (fix f) is of type (or at least can be of type) (a -> a) -> a ...
0
votes
1answer
71 views

Fix point function does not find my fix point

So as to understand the fix function, from Control.Monad.State, fix :: (a -> a) -> a, I have this little code in modifyValue, that increments an integer until 49, then the function always ...
9
votes
4answers
680 views

Define fix-point combinator in Continuation Passing Style

The fix-point combinators are very useful tools to introduce recursion. The Continuation-Passing style is a style of lambda calculus where functions never return. Instead you pass the rest of your ...
1
vote
1answer
70 views

Haskell type and fix recursion examples

When reading about fix because I was interested in having recursive lambdas in my code I came upon this particular example of code (from Here): fix (\rec n -> if n == 0 then 1 else n * rec (n-1)) ...
3
votes
1answer
97 views

What is the fixed point of fix?

A recent poster best left anonymous attempted to implement the factorial function like this: f :: Int -> Int f = fix f This obviously didn't work out too well. But then I got to wondering: can I ...
1
vote
2answers
111 views

Haskell “fix” keyword failed on declaring a recursive lambda function

Seems a function should have a name to be recursive(in order to call itself), so how does a lambda function be recursive? I searched wikipedia and it says this could be done by a "Y-combinator". I ...
-8
votes
2answers
290 views

Tricky factorial in Haskell

Is there is a way to create function to calculate factorial in Haskell, using the following function: fix f = f (fix f)
5
votes
1answer
106 views

Fixed points of representational bifunctors

Edward Kmett's experimental roles package offers various utilities for lifting coercions, some of which I've pasted at the end of this question. The key class in the package is class Representational ...
4
votes
2answers
96 views

Calculating fibonnacci numbers using fix

I am trying to understand how this factorial example works using the function fix :: (a -> a) -> a. Example: factabs :: (Num a, Eq a) => (a -> a) -> a -> a factabs fact 0 = 1 ...
8
votes
2answers
419 views

Why does the F# compiler not create a tail call for this function?

I'm having trouble with the fixed point combinator in F#: let rec fix f a = f (fix f) a fix (fun body num -> if num = 1000000 then System.Console.WriteLine "Done!" else body (num + ...
10
votes
3answers
163 views

Useful instantiations of “fix” on non-function types?

Every time I’ve used fix :: (a -> a) -> a, it’s been at the type ((a -> b) -> a -> b) -> a -> b for some a and b. Is there actually some application of fix where its type ...
3
votes
4answers
767 views

What is fixed point?

I'm rewatching some of the earlier lectures on SICP. The notion of a fixed-point is a bit confusing to me. The fixed-point procedure: should I be thinking about it this way, "it's the way to find a ...
9
votes
2answers
462 views

Scope of mu (μ) bindings in type theory

A list in Haskell might look like this: data List a = Nil | Cons a (List a) A type theoretic interpretation is: λα.μβ.1+αβ which encodes the list type as the fixed point of a functor. In Haskell ...
18
votes
4answers
896 views

Haskell: to fix or not to fix

I recently learned about Data.Function.fix, and now I want to apply it everywhere. For example, whenever I see a recursive function I want to "fix" it. So basically my question is where and when ...
2
votes
1answer
479 views

Fixed-point combinator in F#

This would not work: let rec fix f = f (fix f) The solution is to add an extra parameter: let rec fix f x = f (fix f) x Is there a way to do this using lazy and Lazy.force instead?
9
votes
1answer
213 views

Writing generic instances for Fix/Mu in F-algebras

After reading Milewski's F-algebra article, I tried to implement it and use for a real-world problem. However, I can't seem to figure out how to write instances for Fix, newtype Fix f = Fx { unFix ::...
3
votes
1answer
149 views

Recursive functions vs recursive lambdas in Haskell

I am a bit confused. There is no problem with defining ordinary recursive functions in Haskell. At the same time there is the standard fix function for defining recursive lambdas via fixed points. But ...