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What is the Python code in Haskell and Lambda calculus?

def f1():
   x = 77
   def f2():
      print x

My attempt in lambda calculus

\x. 77 (\x.x)
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Lambda calculus has no concept of state. Printing involves state. – codebliss Nov 29 '09 at 0:31
I presume you intend to return f2 and call f1, because as written your f1 returns None and is uncalled. – cthulahoops Nov 29 '09 at 22:06
What is this Python code trying to do? It is rather stilted code. Perhaps it would be more instructive to have more realistic Python code. Or is there some particular concept in the lambda calculus you are trying understand? – MtnViewMark Jun 15 '10 at 1:35

4 Answers 4

up vote 3 down vote accepted


f1 :: IO ()
f1 = let x = 77
         f2 = print x
     in f2

main :: IO ()
main = f1

Or to be more like your lambda calculus:

f1 :: Int
f1 = let f2 = x
         x = 77
     in f2

main :: IO ()
main = print f1
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I don't know python, so I could be completely wrong, but this is my Haskell interpretation.

f1 = let x = 77 in show x

Or, since you've got a constant there

f1 = show 77
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In lambda calculus:

λprint. print 77
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The Python program doesn't take an argument for the print function. – MtnViewMark Jun 15 '10 at 1:33
It does, implicitly. – Apocalisp Jun 15 '10 at 3:53
Then the proper translation is λ77. λprint. print 77, or, if you flip the arguments, λx.x. :) – Rotsor Oct 13 '11 at 14:32

In Haskell:

f1 = f2
    where x  = 77
          f2 = print x

Refactoring, since IO just confuses the issue:

f1 = f2
    where x  = 77
          f2 = x


f1 = x
    where x = 77

Refactoring, since you want the variable?

f1 = (\x -> x) 77

Beta reduce:

f1 = 77

And you have your program in Haskell.

Lambda calculus doesn't have numeric literals (unlike Haskell), so we must use Church numerals. So compiling "77" to lambda calculus:

f1 = \f.\x. f (f (f (f ( ... ) x)))

And there's your Python program in Lambda Calculus.

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+1 just for using Church numerals. I lol'ed. – Meredith L. Patterson Jun 13 '10 at 22:03
I guess we can optimise it to (\three.(\seven.(\ten.\f.\x.ten (seven f) (seven f x)) (\f.\x.three f (seven f x))) (\f.\x.f (three f (three f x)))) (\f.\x.f(f(f x))). – Rotsor Oct 13 '11 at 14:26

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