问题
Specifically, I noticed that the language of regular expressions itself isn't regular. So, I can't use a regular expression to parse a given regular expression. I need to use a parser since the language of the regular expression itself is context free.
Is there any way regular expressions can be represented in a way that the resulting string can be parsed using a regular expression?
Note: My question isn't about whether there is a regexp to match the current syntax of regexes, but whether there exists a "representation" for regular expressions as we know it today (maybe not a neat as what we know them as today) that can be parsed using regular expressions. Also, please could someone remove the dup since it isn't a dup. I'm asking something completely different. I already know that the current language of regular expressions isn't regular (it is how I started my original question).
回答1:
The answer is probably NO.
As you have pointed out, set of all possible regular expressions itself is not a regular set. Any TRUE regular expression (not those extended) can be converted into finite automata (FA). If regular expression can be represented in a form that can be parsed by itself, then FA can be parsed by regular expression as well.
But that's not possible as far as I know. RE itself can be reduced into three basic operation(According to the Dragon Book):
- concatenation: e.g.
ab
- alternation: e.g.
a|b
- kleen closure: e.g.
a*
The kleen closure can match infinite number of characters, but it cannot know how many characters to match.
Just think such case: you want to match 3 consecutive a
s. Then the corresponding regular expression is /aaa/
. But what if you want match 4, 5, 6... a
s? Parser with only one RE cannot know the exact number of a
s. So it fails to give the right matching to arbitrary expressions. However, the RE parser has to match infinite different forms of REs. According to your expression, a regular expression cannot match all the possibilities.
Well, the only difference of a RE parser is that it does not need a tokenizer.(probably that's why RE is used in lexical analysis) Every character in RE is a token (excluding those escape charcters). But to parse RE, whatever it is converted,one has to face up with NFA/DFA/TREE... all equivalent structures that cannot be parsed by RE itself.
来源:https://stackoverflow.com/questions/19533804/is-there-a-regular-language-to-represent-regular-expressions