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If I define Poly-time functions, the functions that are computable by a turing machine in maximum polynomial(n) time, which n is size of input. Is the class of these functions recursively enumerable?

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You should probably post this to – tonio Feb 16 '11 at 15:35
I did it actually,and they closed it!they said it is undergrad question.... – Saiiiira Feb 16 '11 at 15:36

Well, the answer appears to be no, have a look at the diagram in Complexity Class.

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So I'm talking about class P,am I right? – Saiiiira Feb 16 '11 at 16:42
I think you are referring to the fact that the class RE is a proper subset of the class P. But there is a world of difference between listing programs and running programs. For example you can write a program that lists programs that are proven to halt. But even though that algorithm is in RE, many of the programs listed will not be in RE, or P even. So @Saiiiira's program can easily list things in P but not RE. – btilly Feb 16 '11 at 18:36
Thanks.Yes,I just want to list the functions that are in class it possible?As I've searched it is possible,but I want to know how? – Saiiiira Feb 16 '11 at 20:24

The answer is yes,actually I've also found the proof in a book. Thanks to all,helped me a lot with directions given:)

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I'm pretty sure that the answer is no. A program to recursively enumerate Poly-time functions would have to at some point tell you whether a function that solves the traveling salesman problem is Poly-time. Whether or not that specific question is answerable is at this time still open.

I don't know what I was smoking with that terrible answer. If the traveling salesman problem is not Poly-time, the program never has to discover that fact. It just has to never get around to listing any solutions to that. Which is easy because it will never find one.

One important detail that I am unclear on is how you are representing functions, and what you consider a unique function.

Suppose that function equals, "program that runs in Poly-time" and you want to list all programs, regardless of whether they produce the same output.. Then your answer comes down to, "If a given program is Poly-time, is there always a proof of that fact?" That is clearly false. You can have a program that searches for a poly time for a proof of some open question, and if it finds it it wastes exponential time before producing a final output. This program is poly time, but you can't prove it without proving that the open question is false.

Suppose that function for you equals, "rule that associates inputs to outputs" and you're not OK with listing multiple programs that encode the same function. Let us modify the previous pathological function to modify its output rather than wasting time if said proof was discovered. Now you can prove that this program is poly time, but you can't prove whether it represents a different function from one that doesn't do the whole proof step (and possibly modify its output).

Suppose that function for you equals, "rule that associates inputs to outputs" and you are OK with listing multiple programs that encode the same function but don't want every one. Suppose that prog is a program that might or might not be poly time and p(x) is a polynomial. It is easy to write a second program that emulates the first for p(x) steps, and if the other is still running emits some fixed output. This second program is guaranteed to be poly time. If, in fact, prog is poly time, then some program of this form will represent the same function that prog does, and the list of outputs will therefore include every single possible poly functions. (But the same function will be encoded in lots of different ways.)

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this program should just give number to Poly-time functions,like when we give number to all computable functions using universal turing machine.I don't understand why should it tell me wether a problem is Poly-time? – Saiiiira Feb 16 '11 at 16:25
in this book,Theory of computation By Dexter Kozen,page 313,exercise 127 it is said that the answer is yes...I've saw it in google books just now... – Saiiiira Feb 16 '11 at 17:03
@Saiiiira: Can you provide a link? I can't find that page online, and strongly suspect that you are misreading something. – btilly Feb 16 '11 at 18:24
@Saiiiira: My apologies for my previous bad answer. I have updated with a complete answer that I believe to be correct. Depending on exactly what you are looking for, the answer can be either yes or no. – btilly Feb 17 '11 at 19:46

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