utm theorem

From Wikipedia, the free encyclopedia

In computability theory the utm theorem, or universal turing machine theorem, is a basic result about Gödel numberings of the set of computable functions. It proves the existence of a computable universal function which is capable of calculating any other computable function. The universal function is an abstract version of the universal turing machine, thus the name of the theorem.

Rogers equivalence theorem provides a characterization of the Gödel numbering of the computable functions in terms of the smn theorem and the utm theorem.

[edit] utm theorem

Let $\varphi$ be a Gödel numbering of the set of computable functions, then the partial function

$u_\varphi: \mathbb{N}^2 \to \mathbb{N}$

defined as

$u_\varphi(i,x) := \varphi_i(x) \qquad i,x \in \mathbb{N}$

is computable.

$u_\varphi$ is called the universal function for $\varphi$

[edit] References

Rogers, H. (1987) [1967]. The Theory of Recursive Functions and Effective Computability. First MIT press paperback edition. ISBN 0-262-68052-1.
Soare, R. (1987). Recursively enumerable sets and degrees. Perspectives in Mathematical Logic. Springer-Verlag. ISBN 3-540-15299-7.

utm theorem

From Wikipedia, the free encyclopedia

[edit] utm theorem

[edit] References

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