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Here's the grammar, which is supposed to describe a language of nested braces with commas as delimiters:

L ::= {L} | L,L |

A few more examples of strings I'd expect the grammar to accept and reject:




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what tooling are you using to get the left recursion error from? –  Simeon Pilgrim Jul 8 '09 at 1:57
I'm not using any tool. –  wkf Jul 8 '09 at 2:00
homework question? –  J-16 SDiZ Jul 8 '09 at 2:01
Not homework, just trying to work my way through a book on compilers. For fun, I swear! –  wkf Jul 8 '09 at 2:03

2 Answers 2

up vote 4 down vote accepted

Done by hand:

L ::= { L } | { L } , | , L | ε

Or, instead of just winging it we could use a more systematic approach and apply the algorithm from Wikipedia on removing immediate left recursion:

L ::= { L } L1 | L1
L1 ::= ε | , L L1

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Right on, now I feel stupid. Thanks! –  wkf Jul 8 '09 at 2:02
Can't think of a way to derive {{},} from this grammar –  Johannes Schaub - litb Jul 8 '09 at 2:03
@litb: the outer {} is the first rule {L} the {}, is firstly second rule L,L with the first of those {} and the second empty. –  Simeon Pilgrim Jul 8 '09 at 2:10
@Simeon, yep it works now with the updated grammar :) –  Johannes Schaub - litb Jul 8 '09 at 2:12
nod, I only just clicked you where meaning JK's grammar vs. wkf's my bad. –  Simeon Pilgrim Jul 8 '09 at 2:15

First of all, that grammar won't accept your first example, since it requires the commas to be after the close brace and before the open brace. I would suggest to re-write it as

L::= {L} | ,L

This won't get rid of the left recursion, but it will at least match your acceptable answers.

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Not true. His grammar will accept {,}, where the ',' is produced by L1=L2,L3 with L2 and L3 being empty. –  John Kugelman Jul 8 '09 at 2:04
Your right - I didn't realise that that was the point of the empty rule at the end –  a_m0d Jul 8 '09 at 2:27

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