In mathematics, Church encoding is a means of representing data and operators in the lambda calculus. The Church numerals are a representation of the natural numbers using lambda notation. The method is named for Alonzo Church, who first encoded data in the lambda calculus this way.

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can't deduce the numeral representation (church encoding) of a lambda expression λx.λy.x(xy)

I have a lambda expression: λx.λy.x(xy), and I'm supposed to infer the integer representation of it. I've read a lot about Church encodings and Church numerals specifically but I can't find what ...
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Are Free monads are Church numerals?

A commentator recently stated: Free monads are Church numerals -- just using (endo-) functors instead of functions! He goes on to explain this saying: they are both an endofunct(ion|or) ...
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Implement in Haskell the Church encoding of the pair for polymorphic λ-calculus/System F

I want to implement the Church encoding of the pair in polymorphic lambda calculus in Haskell. On page 77, section 8.3.3 of Peter Selinger's notes on lambda calculus, he gives a construction of the ...
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Swift higher order function (Church pair aka cons) with generic parameter types not accepting input parameter types

I was messing around with the functional programming in Swift 2.1, trying to implement the Church encoding pair/cons function (cons = λx λy λf f x y in untyped lambda calculus), which I had read ...
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Y-Combinator factorial in javascript works for numbers not for the Church numerals.

I managed to implement Church encoding and Y-Combinator using ES6 arrow function in javascript. But when I tried to evaluate the factorial function, FALSE = a => b => b TRUE = a => b => ...
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Recursion for church numerals in scheme

I have defined Church numeral zero and some other standard functions on church numerals according to Wikipedia definitions as following: (define n0 (λ (f x) x)) (define newtrue (λ(m n) m)) ...
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More efficient tail of church encoded list

This is a literate haskell post. Simply save it as "ChurchList.lhs" to run it. > {-# LANGUAGE Rank2Types #-} A Church encoded list is a way of representing a list via a function. It resembles ...
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What does “Error: Universe inconsistency” mean in Coq?

I am working through Software Foundations and am currently doing the exercises on Church numerals. Here is the type signature of a natural number: Definition nat := forall X : Type, (X -> X) ...
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Is it possible to use church encodings without breaking equational reasoning?

Mind this program: {-# LANGUAGE RankNTypes #-} import Prelude hiding (sum) type List h = forall t . (h -> t -> t) -> t -> t sum_ :: (Num a) => List a -> a sum_ = \ list -> ...
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Catamorphisms for Church-encoded lists

I want to be able to use cata from recursion-schemes package for lists in Church encoding. type List1 a = forall b . (a -> b -> b) -> b -> b I used a second rank type for convenience, ...
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How do I use the Church encoding for Free Monads?

I've been using the Free datatype in Control.Monad.Free from the free package. Now I'm trying to convert it to use F in Control.Monad.Free.Church but can't figure out how to map the functions. For ...
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Is there any non-recursive term that folds over a scott-encoded list?

Suppose that I have a scott-encoded list such as: scott = (\ c n -> c 1 (\ c n -> c 2 (\ c n -> c 3 (\ c n -> n)))) I want a function that receives such kind of list and converts it to ...
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How to implement Church Numerals using Java 1.8

I'm trying to implement Church Numerals in Java 1.8. My first attempt was: import java.util.function.UnaryOperator; @FunctionalInterface public interface ChurchNumeral { public static ...
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Sml Church numeral type inference

I have this expression in SML and need to find the most general type of it. When run through the compiler I get what it shows below. How would I go about finding what the most general type would be of ...
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trying to understand church encoding in Scheme

I'm trying to understand the whole principal of church encoding through Scheme. I think I understand the basics of it such as Church numeral for 0 (define c-0 (lambda (f) (lambda (x) x))) Church ...
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Adding church numerals using lambda functions in python

I'm trying to learn python and CS on my own using a course online that is based off SICP. I understand the basics of church numerals, but I am having trouble on adding church numerals using lambda ...
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Is it possible to implement addition on typed Church numerals using iterated incrementation?

I can't find a way to define addition as repeated incrementation, despite this being possible in an untyped language. Here is my code: {-# LANGUAGE RankNTypes #-} type Church = forall a . (a -> a) ...
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Church encodings (conditionals)

I'm trying to write out some lambda calculus, but I can't get church conditionals to work. I should probably say that I'm a Haskell noob. I've looked at solutions online and on SO, but they all ...
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Is the following a legit successor function for lambda calculus ? (Church Numeral)

I have read from the books that, the successor for Church Numerals is of the form: (\lambda n f x. f (n f x) ) Last night I came up with this: (\lambda a b c. (a b) (b c) ) I believe it also ...
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Looking for a Church-encoding (lambda calculus) to define < , > , !=

I have to create some Lambda functions for > , < and != I don't have an idea how to , could anyone help me please ? PS: We just started with Lambda Calculus, so please do not assume any previous ...
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Define the binary exponential operator CARAT.in lambda calculus CARAT

I am trying to define binary exponential operator in lambda calculus say operator CARAT. For example, this operator may take two arguments, the lambda encoding of number 2 and the lambda encoding of ...
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encoding binary numerals in lambda calculus

I have not seen any mention of binary numerals in lambda calculus. Church numerals are unary system. I had asked a question of how to do this in Haskell here: How to implement Binary numbers in ...
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How to implement Binary numbers in Haskell

I have seen the following data constructor for Church numerals data Nat = Zero | Succ Nat deriving Show But this is unary numbers. How do we implement a data constructor for Binary numbers in ...
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Church numerals: How should i interpret the numbers from expressions?

Can someone explain to me using substitutions how we get a number "zero" or the rest of natural numbers ? For example the value: "zero" λf.λx.x if i apply this expression on an another ...
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Why are difference lists not an instance of foldable?

The dlist package contains the DList data type, which has lots of instances, but not Foldable or Traversable. In my mind, these are two of the most "list-like" type classes. Is there a performance ...
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Why do we use folds to encode datatypes as functions?

Or to be specific, why do we use foldr to encode lists and iteration to encode numbers? Sorry for the longwinded introduction, but I don't really know how to name the things I want to ask about so ...
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Lambda calculus in Haskell: Is there some way to make Church numerals type check?

I'm playing with some lambda calculus stuff in Haskell, specifically church numerals. I have the following defined: let zero = (\f z -> z) let one = (\f z -> f z) let two = (\f z -> f (f ...
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Operations on Church Lists in Haskell

I am referring to this question type Churchlist t u = (t->u->u)->u->u In lambda calculus, lists are encoded as following: [] := λc. λn. n [1,2,3] := λc. λn. c 1 (c 2 (c 3 n)) ...
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Practical reasons for Сhurch Encoding

Church encoding (aka Visitor Pattern) is a way of representing data as functions: instead of data T = C1 F1 F2 | C2 F3 F4 you can define data T = T (forall r. (F1 -> F2 -> r) -> (F3 -> ...
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Church lists in Haskell

I had to implement the haskell map function to work with church lists which are defined as following: type Churchlist t u = (t->u->u)->u->u In lambda calculus, lists are encoded as ...
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Is the Church numeral encoding of natural numbers unnecessarily complicated?

The Structure and Interpretation of Computer Programs book I've been reading presents Church numerals by defining zero and an increment function zero: λf. λx. x increment: λf. λx. f ((n f) x) This ...
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Expressing Church Numerals with Boost.Bind

Church numerals can be expressed in C++0x (C++11?) using the new lambda parts of the language using something like this: typedef function<int(int)> F; static const F id = [=](int x) { return x; ...
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Subtraction of church numerals in haskell

I'm attempting to implement church numerals in Haskell, but I've hit a minor problem. Haskell complains of an infinite type with Occurs check: cannot construct the infinite type: t = (t -> t1) -> ...
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Arithmetic with Church Numerals

I am working through SICP, and the problem 2.6 has put me in something of a quandary. In dealing with Church numerals, the concept of encoding zero and 1 to be arbitrary functions that satisfy certain ...
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How to get predecessor of a church numeral

I'm practicing with SML and I'm doing a small assignment where we have to implement Church numerals defined as: datatype 'a church = C of ('a -> 'a) * 'a -> 'a example val ZERO = C(fn ...
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Church numeral for addition

I am stuck up at the following step. It will be great if someone can help me out: 2 = λfx.f(f x) 3 = λfx.f(f(f x)) ADD = λm n f x. m f (n f x) My steps are: (λm n f x. m f (n f x)) (λf x.f(f(f ...
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How can I make Church numerals more human readable in lisp?

I can define church numerals fairly easy using scheme: > (define f (lambda (x) x)) > (f f) ;0 #<procedure:f> > (f (f f)) ;1 #<procedure:f> However, this doesn't make it very ...
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Closures and universal quantification

I've been trying to work out how to implement Church-encoded data types in Scala. It seems that it requires rank-n types since you would need a first-class const function of type forAll a. a -> ...