# An infinite language can't be regular? What is a finite language?

I read this in a book on computability:

(Kleene's Theorem) A language is regular if and only if it can be obtained from finite languages by applying the three operations union, concatenation, repetition a finite number of times.

I am struggling with "finite languages".

Consider this language: `L = a*`

It is not finite. It is the set `{0, a, aa, aaa, ...}` which is clearly an infinite set (`0` = the empty string).

So it is an infinite language, right? That is, "infinite set" means "infinite language", right?

Clearly, `a*` is a regular language. And it is an infinite language. Thus, by Kleene's Theorem it cannot be a regular language. Contradiction.

I'm confused. I guess that I don't know what "finite language" means.

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This would probably be more appropriate for math.stackexchange.com. Automata theory is not really involved in writing programs. –  Barmar Jul 1 at 19:56
–  Barmar Jul 1 at 19:58
IIRC, a* is only a regular language, if a is a regular language (note, that "a*" means "all elements in a"). And thus, it wouldn't be a contradiction to to Kleene's Theorem. –  waka Jul 1 at 20:00
Can be obtained from [not "is"] a finite languages by applying .. although I've not seen it written like that before. I would expect to read "a language over an alphabet is regular iff it can be accepted by a finite automaton" or similar. –  Paul Jul 1 at 20:05
Which book you are reading `repetition a finite number of times` is wrong! a good reference to read Kleene's Theorem –  Grijesh Chauhan Jul 2 at 5:43

You are on the right track, it could be clearer. Kleen's theorem expresses the equivalence of three statements

A language is regular == A language can be expressed by a Regular Expression == A language can be expressed by a finite automita.

Your example is indeed a regular language. A finite language is what you would expect it to be, a language that can be listed in a finite amount of time.

When they are talking about repetition, they are talking about the Kleen Star operation, which is exactly what `a*` represents, the set `{empty, a, aa, aaa, ...}`

EDIT:

I have found this link: Kleenes Theorem which helps quite a bit. It by 'repetition' they mean Kleen Star, then the original statement makes sense. `a*` is `Kleen_Star(a)`

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