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Continuing on exercises in book Lambda Calculus, the question is as follows:

Suppose a symbol of the λ-calculus alphabet is always 0.5cm wide. Write down a λ-term with length less than 20 cm having a normal form with length at least (10^10)^10 lightyear. The speed of light is c = 3 * (10^10) cm/sec.

I have absolutely no idea as to what needs to be done in this question. Can anyone please give me some pointers to help understand the question and what needs to be done here? Please do not solve or mention the final answer.

Hoping for a reply.

Regards, darkie

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I think this is a valid question as lambda calculus is becoming more important to programming, now. –  James Black Jun 21 '10 at 0:36

2 Answers 2

up vote 2 down vote accepted

Not knowing anything about lambda calculus, I understand the question as following:

You have to write a λ-term in less than 20 cm, where a symbol is 0.5cm, meaning you are allowed less than 40 symbols. This λ-term should expand to a normal form with the length of at least (10^10)^10 = 10^100 lightyears, which results in (10^100)*2*3*(10^10)*24*60*60 symbols. Basically a very long recursive function.

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I think your analysis is well-done, and you show enough to make it easy to write the solution. –  James Black Jun 21 '10 at 0:38
I have a query, how can I be sure that my λ - recursive function would exceed that many symbols? I mean, that is too many symbols to ensure, isn't it? –  name_masked Jun 21 '10 at 0:40
Yes, it is too much to test - which is exactly the point the task is about. You need to define a function, that grows extremely fast. An example for such a function would be the Ackermann function. I'm not sure how far this applies in λ-Calculus. Busy Beaver would also be such a function, growing extremely fast over all bounds. –  Femaref Jun 21 '10 at 0:57

Here's another hint: in lambda calculus, the typical way to represent an integer is by its Church encoding, which is a unary representation. So if you convert the distances into numbers, one thing that would do the trick would be a small function which, when applied to a small number, terminates and produces a very large number.

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