Recursively enumerable languages/sets are also known as semi-decidable. They aren't decidable, because there isn't a machine that looks at the input and says yes or no. Semi-decidable means you can write a machine that looks at the input and either says yes or fails to halt. *Semi-decidable* turns out to be equivalent to *recursively enumerable* in the same way that *decidable* is equivalent to *recursive*:-

If you have a Turing machine R that enumerates a recursively enumerable language, you can make a new machine D that takes an input that may or may not be in the language/set. D runs R until R outputs the first element of the set, and then D compares that with its input. If they match, it returns a "yes" result. If they don't match, it continues running R until it gets the next element, and so on. Since R never halts (because the language is only recursively enumerable, not recursive), D will either answer yes or not halt.

Conversely, if you have a Turing machine D that answers yes or fails to halt, you can make a new machine R which uses the usual technique to run several instances of D in parallel one step at a time with various inputs: all the elements which may or may not be in the set. Every time one of the parallel executions of D halts with a "yes" answer, R outputs that input of D, and continues executing D on all the remaining inputs. R will never halt (because there are some inputs on which D will not halt), but eventually it will output every element for which D answered "yes", that is, every element in the set/language.

Semi-decidable sets are, strictly speaking, undecidable too, just as recursively enumerable sets are not enumerable. But it's a useful enough classification to be treated separately.

`A problem is called partially decidable, semidecidable, solvable, or provable if A is a recursively enumerable set. Partially decidable problems and any other problems that are not decidable are called undecidable.`

en.wikipedia.org/wiki/Undecidable_problem and en.wikipedia.org/wiki/Recursively_enumerable_language – tvanfosson Feb 26 '12 at 14:42