In the lastlesson we showed that the set
LD = { <M> | Machine M does not accept input <M>}
is not computably enumerable. In this lesson we show there are
languages that are computably enumerable but not computable.
For a set A, let A be the complement of A, i.e., all of the strings of Σ* not in A. If A is computable then A is also computable--at the end if we accepted then we reject and vice-versa. Note this does not work in general for computably enumerable; switching reject and accept does not affect whether a machine halts on a given input.
Now consider the set
LA = { <M> | Machine M does accept input <M>}
LA is just
LD.
Note the LA is computably enumerable as we can just simulate M on <M>. If LA were computable then so would LD which we know is not even computably enumerable. Thus we have LA as our first example of a noncomputable computably enumerable set.
Besides languages we can also consider computable functions. Consider a Turing machine with an output tape. We can view it as computing a function f from Σ* to Σ* where the value of f is the contents of the output tape after the machine enters a specified halting state. We say a total function f is computable if there is such a Turing machine computing f. We can also consider partially computable functions where f(x) may not be defined for some inputs x. On these inputs the corresponding machine does not halt.
In the next lesson we will use computable functions to show that other languages are not computable or computably enumerable.
For a set A, let A be the complement of A, i.e., all of the strings of Σ* not in A. If A is computable then A is also computable--at the end if we accepted then we reject and vice-versa. Note this does not work in general for computably enumerable; switching reject and accept does not affect whether a machine halts on a given input.
Now consider the set
Note the LA is computably enumerable as we can just simulate M on <M>. If LA were computable then so would LD which we know is not even computably enumerable. Thus we have LA as our first example of a noncomputable computably enumerable set.
Besides languages we can also consider computable functions. Consider a Turing machine with an output tape. We can view it as computing a function f from Σ* to Σ* where the value of f is the contents of the output tape after the machine enters a specified halting state. We say a total function f is computable if there is such a Turing machine computing f. We can also consider partially computable functions where f(x) may not be defined for some inputs x. On these inputs the corresponding machine does not halt.
In the next lesson we will use computable functions to show that other languages are not computable or computably enumerable.
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