The grammar that generates an identifier followed by an equals sign followed by a finite sequence of identifiers is *regular*. This means that strings in the language can be parsed using a DFA or regular expression. No need for fancy nondeterministic or *LL*(*) parsers.

To see that the language is regular, let *Id* = U {*a* : *a* ∈ Γ}, where Γ ⊂ Σ is the set of symbols that can occur in identifiers. The language you are trying to generate is denoted by the regular expression

*Id*^{+} =( *Id*^{+})^{*} *Id*^{+}

Setting Γ = {*a*, *b*, ..., *z*}, examples of strings in the language of the regular expression are:

- look = i am in a regular language
- hey = that means i can be recognized by a dfa
- cool = or even a regular expression

There is no need to parse your language using powerful parsing techniques. This is one case where parsing using regular expressions or DFA is both appropriate and optimal.

**edit:**

Call the above regular expression *R*. To parse *R*^{*}, generate a DFA recognizing the language of *R*^{*}. To do this, generate an NFA recognizing the language of *R*^{*} using the algorithm obtainable from Kleene's theorem. Then convert the NFA into a DFA using the subset construction. The resultant DFA will recognize all strings in *R*^{*}. Given a representation of the constructed DFA in your implementation language, the required actions - for instance,

- Add the last identifier parsed to the right-hand side of the current declaration statement being parsed
- Add the last declaration statement parsed to a list of parsed declarations, and use the last identifier parsed to begin parsing a new declaration statement

can be encoded into the states of the DFA. In reality, using Kleene's theorem and the subset construction is probably unnecessary for such a simple language. That is, you can probably just write a parser with the above two actions without implementing an automaton. Given a more complicated regular langauge (for instance, the lexical structure of a programming langauge), the conversion would be the best option.