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Questions tagged [hindley-milner]

In type theory, Hindley–Milner (HM) is a classical type inference method with parametric polymorphism for the lambda calculus.

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What substitution should this unification return?

What should be the result of unifying these two types? 1) a -> a 2) Int -> b Is this the right result? { a |-> Int; b |-> a }
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[F#][Type inference] - How to improve my program?

I'm currently building a program to type inference in F# using the following AST: // errors // exception SyntaxError of string * FSharp.Text.Lexing.LexBuffer<char> exception TypeError of string ...
Marc's user avatar
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How to comprehend Algorithm W in Hindley–Milner type system?

I am studying the algorithm W. From my understand, algorithm W takes (Γ,expr) as input ,where Γ is the context, and expr is the expression. The output is a substitution σ. Then I can use the ...
Joe's user avatar
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Characterizing the type of functions that can accept `()` as input (without monomorphizing)

Here are a few simple functions: f1 :: () -> () f1 () = () f2 :: a -> a f2 a = a f3 :: a -> (a, a) f3 a = (a, a) f4 :: (a, b) -> a f4 (a, b) = a All of f1, f2, and f3 are able to ...
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Can a type statically guarantee that a function to pairs only partially depends on its input?

Consider the type of a function from a's to pairs of b's and c's, a -> (b, c). (I'll use Haskell notation for types and functions, but this isn't a question about Haskell per se.) There are many ...
SEC's user avatar
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5 votes
1 answer
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Are function parameters not polymorphic in Algorithm W (or Haskell)?

I am implementing Algorithm W for a toy language. I came across a case that I imagined would type check, but doesn't. I tried the same in Haskell, and to my surprise it didn't work there either. > (...
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Reasoning about types in Haskell

Chapter 16 of "Haskell Programming from First Principles" on page 995 has an exercise to manually work out how (fmap . fmap) typechecks. It suggests substituting the type of each fmap for ...
Unsatisfied Zebra's user avatar
3 votes
1 answer
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How can I infer types for recursive functions?

I'm trying to implement language with type inference based on Hindley-Milner algorithm. But I don't know how to infer types for recursive functions: f = g g = f Here I must generate and solve ...
Смирнов Илья's user avatar
1 vote
2 answers
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How to represent functions with multiple arguments in Hindley-Milner?

I'm reading a functional programming tutorial called Professor Frisby's Mostly Adequate Guide to Functional Programming, the author gives an introduction to Hindley-Milner and several examples about ...
Searene's user avatar
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What is the best algorithm for Hindley Milner type inference when one wants to optimize for error messages

I want to implement Hindley-Milner type inference but as a non-academic person that doesn't know type theory at all, I'm getting a bit overwhelmed by all the different algorithms and their properties, ...
Stefan Wullems's user avatar
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How to interpret this Ramda signature? [duplicate]

Could someone explain how to understand this notation: ((a, b) → a) → a → [b] → a See: https://ramdajs.com/docs/#reduce
Maciej Miklas's user avatar
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How does Haskell perform Beta conversion to derive a type?

I'm learning Haskell by taking fp-course exercise. There is a question block my way. I don't know how Haskell infer lift2 (<$>) (,)'s type, and turn out Functor k => (a1 -> k a2) -> a1 -...
zichao liu's user avatar
1 vote
1 answer
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Unification of applicators with different arity through substitution

I'm able to unify the following terms: foo :: (a -> b -> c) -> a -> b -> c bar :: (a' -> b') -> a' -> b' foo bar a ~ (a' -> b') b ~ a' c ~ b' (a' -> b') -> a' -> ...
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4 votes
1 answer
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Generalized HM vs. Higher-Order Unification

AFAIK, unification used in the Hindley-Milner type system can be generalized to unify higher-kinded types by allowing type vars in constructor position and by relaxing the arity constraint in such ...
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Can Hindley-Milner return more than one error?

I am pretty new to type inference and was wondering if there are any good extensions or papers out there for HM that allows allowing more than one error. I might be missing something but if there is a ...
databasechaser's user avatar
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Hindley-Milner - conditional Substitutions?

I have been trying to build a type system with the Hindley-Milner Algorithm and ran into the following challenge and was curious if there are any resources or papers out there I can take a look at. ...
databasechaser's user avatar
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Can someone explain how to unify types(Haskell)?

Can someone explain type unification in Haskell? For example: snd . snd :: (a1, (a2, c)) -> c Example How do we get to, (a1, (a2, c)) -> c, from snd . snd? Thanks in advance for the help.
xyz123's user avatar
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Is there any type inference system that works in all cases?

Is there any type inference algorithm that can always (or almost always) infer the correct type? I know that the Hindley Milner algorithm can do it in quite a bit of cases but not all of them (i.e., ...
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In regards to the Hindley-Milner Algorithm, what does a type constructor mean?

Say I have the letters A, B representing type variables which are initially unbound and a,b,c representing type constructors. I need then to show the bindings of type variables obtained through ...
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Hindley-Milner type of a function that takes itself as an argument

Suppose you had a function f that would be used as follows: (f f (x-1)) What can you deduce about the type of f? It seems to be recursive, ie, f :: (ftype) -> int -> int.
YOLT's user avatar
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Is there an effective way to generate a function given a generic (esp. with monads) type signature in Haskell?

I have already seen a variety of questions of the form "Given type signature XXX, find implementation in Haskell." Therefore it is natural to ask whether this can be generalized or algorithmized. A ...
Trebor's user avatar
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What's the F# type inference approach to generics?

I'm trying to understand rules around type inference as I'd like to incorporate it into my own language, and in that spirit I've been playing around with F#'s type inference, and the following struck ...
Jeff's user avatar
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Which programming languages support functions that take themselves as arguments?

I'm doing an academic exercise (for personal growth). I want to find programming languages that allow you to define functions that are capable of accepting themselves (i.e., pointers to themselves) as ...
Joshua Wise's user avatar
4 votes
1 answer
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Hindley-Milner type inference for overloaded functions

How does the Hindley-Milner algorithm work when there are overloaded functions? In a simple form (without overloads) it looks clean: y = arr[x1] //it's Generic. x1: int, arr: T[], y:T z = y+1// z:...
tmt's user avatar
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Extend the W algorithm to containers

I would like to extend the W algorithm to the inference of tuples and lists in F#, a priori, there are only two rules to add, which I did, however, the result is partially bad. Indeed, if I test a ...
Foxy's user avatar
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30 votes
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Why does calling a method on a variable prevent Rust from inferring the type of the variable?

This code compiles: #[derive(Debug, Default)] struct Example; impl Example { fn some_method(&self) {} } fn reproduction() -> Example { let example = Default::default(); // ...
Shepmaster's user avatar
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7 votes
2 answers
640 views

Simply typed lambda calculus vs Hindley-Milner type system

I have recently been learning about λ-calculus. I understood the difference between untyped and typed λ-calculus. But, I'm not much clear about the distinction between the Hindley-Milner type system ...
him's user avatar
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2 answers
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What is the difference between '.' and '<<<' when performing function composition?

I'm trying to perform function composition in Haskell, and I'm not sure which operator is the correct one to use. The docs contain these two type signatures: (.) :: (b -> c) -> (a -> b) -&...
achalk's user avatar
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Haskell type checking and determinism

According to the Haskell 2010 language report, its type checker is based on Hindley-Milner. So consider a function f of this type, f :: forall a. [a] -> Int It could be the length function for ...
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Can type inferer detect type errors?

I am developing a interpreter of a functional programming language, which uses Hindley-Milner type system. The question is, where should type errors occur(be detected)? For example, if I apply ...
suhdonghwi's user avatar
6 votes
1 answer
2k views

Hindley Milner type inference for mutually recursive functions

I'm making a strongly typed toy functional programming language. It uses the Hindley Milner algorithm as type inference algorithm. Implementing the algorithm, I have a question on how to infer types ...
suhdonghwi's user avatar
1 vote
2 answers
124 views

Inferred type of an infinitely recursive function

For a loop like below: let rec loop () = loop () the signature according to try.ocamlpro.com is: val loop : unit -> 'a = <fun> Why is this the case? loop() never stops calling itself so ...
Kevin Wu's user avatar
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7 votes
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Can I verify whether a given function type signature has a potential implementation?

In case of explicit type annotations Haskell checks whether the inferred type is at least as polymorphic as its signature, or in other words, whether the inferred type is a subtype of the explicit one....
user avatar
2 votes
3 answers
560 views

Does Scala have a value restriction like ML, if not then why?

Here’s my thoughts on the question. Can anyone confirm, deny, or elaborate? I wrote: Scala doesn’t unify covariant List[A] with a GLB ⊤ assigned to List[Int], bcz afaics in subtyping “...
Shelby Moore III's user avatar
1 vote
1 answer
118 views

How to derive the type of an applicator applied to the identity function

I want to derive the type of the following contrived applicator applied to the identity function. To achieve this I probably have to unify the type portion of the first argument (a -> [b]) with the ...
user avatar
2 votes
1 answer
399 views

Is there something infeasible about statically-typing actor models of interprocess communication?

So I only recently encountered akka outside of a toy capacity, and I can't help notice that it and OTP share dynamic typing despite scala's general preference for static types. I started digging ...
jcc333's user avatar
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2 votes
1 answer
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Problems With Type Inference on (^)

So, I'm trying to write my own replacement for Prelude, and I have (^) implemented as such: {-# LANGUAGE RebindableSyntax #-} class Semigroup s where infixl 7 * (*) :: s -> s -> s ...
Crazycolorz5's user avatar
1 vote
2 answers
605 views

Functional JavaScript: What is the Hindley-Milner Type Signature of Compose?

Is the following attempt at the Hindley-Milner Type Signature for the compose function correct? // compose :: (f -> [f]) -> (f -> f -> f) -> [f] -> f const compose = (...fns) => ...
MFave's user avatar
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6 votes
1 answer
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why does Haskell require numbers to be disambiguated for printf but not for show?

Why is printf "%d\n" 3 ambiguous but not show 3? Could the printf module be rewritten to provide automatic disambiguation? Presumably something like show must be done at the lower levels of printf ... ...
Rick Majpruz's user avatar
2 votes
1 answer
152 views

How to abstract over monads without fighting the type system in Haskell?

I'm currently building a server in haskell and as a newbie to the language, I'd like to try a new approach zu Monad composition. The idea is that we can write library methods like isGetRequest :: ...
bloxx's user avatar
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2 votes
1 answer
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Haskell: Labeling an AST with type information using Algorithm W

We have an AST definition: data Term a = Lam String a | App a a | Var String deriving(Read,Show,Eq,Functor,Foldable,Traversable) And an F-Algebra for the type inference: type Wrapped m a = ...
user47376's user avatar
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6 votes
2 answers
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Algorithm W using recursion schemes

I wanted to be able to formulate the hindley-milner type inference algorithm using fix-point data types and recursion schemes. Disregarding all detail apart from the actual recursion parts: w env ...
user47376's user avatar
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2 votes
1 answer
278 views

Haskell: Rigid type variable error when passing function as argument

GHC is saying my function is too general to be passed as an argument. Here is a simplified version that reproduces the error: data Action m a = SomeAction (m a) runAction :: Action m a -> m a ...
Marcelo Lazaroni's user avatar
2 votes
1 answer
622 views

`Let` inference in Hindley-Milner

I am trying to teach myself Hindley-Milner type inference by implementing Algorithm W in the language I usually use, Clojure. I am running into an issue with let inference, and I'm not sure if I'm ...
grandinero's user avatar
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7 votes
2 answers
2k views

How does Rust solve mutability for Hindley-Milner?

I've read that Rust has very good type inference using Hindley-Milner. Rust also has mutable variables and AFAIK there must be some constraints when a HM algorithm works with mutability because it ...
Peter Lenkefi's user avatar
1 vote
1 answer
2k views

Type information in Abstract Syntax Trees

What type information exists in an abstract syntax tree? How are ASTs used for type inferencing? I don't understand how type input and output can be derived given an AST when none of the nodes ...
Soubriquet's user avatar
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10 votes
4 answers
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Limit a number to a range (Haskell)

I am exposing a function which takes two parameters, one is a minimum bound and the other is a maximum bound. How can I ensure, using types, that for example the minimum bound is not greater than the ...
doodledood's user avatar
7 votes
0 answers
320 views

Implementing an affine type system

In an affine type system, resources can be used at most once. Starting from a Hindley-Milner type system, it seems that a simple way to enforce affinity is to simply remove a variable from the ...
max's user avatar
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9 votes
1 answer
309 views

runST with Hindley-Milner type system

If I understand the ST monad in Haskell correctly, runST uses rank-2 types in a clever way to ensure that a computation does not reference any other thread when escaping the monad. I have a toy ...
max's user avatar
  • 1,057
2 votes
1 answer
92 views

How to derive a procedure's HM type based on its implementation?

Given these two procedures (written in JavaScript) … // comp :: (b -> c) -> (a -> b) -> (a -> c) const comp = f=> g=> x=> f (g (x)) // comp2 :: (c -> d) -> (a -&...
Mulan's user avatar
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