I'm trying to make my own LR(0) parser, and I'm running into trouble with some grammars.
Basically, for the grammar
exp: mexp mexp: '1' mexp: mexp '*' '1'
my parser is outputting
State 0: • 1 | • mexp | • exp | • mexp * 1 State 1: 1 • State 2: exp • State 3: mexp • * 1 | mexp • State 4: mexp * • 1 State 5: mexp * 1 •
with the warning
(state 3, *) already has reduction: exp: mexp
The LR(0) table my program derived for this grammar is:
'1' exp mexp '*' $ State 0: s1 s2 s3 State 1: r3 r3 r3 State 2: acc State 3: r2 s4 r2 State 4: s5 State 5: r4 r4 r4
where $ denotes the end of file.
The warning stems from the fact that state 3 -- which corresponds to
mexp • * 1 | mexp • -- has both a reduction
r2 and a state transition
s4 for the input
But it seems like according to Wikipedia, this should not be happening -- I should only have reductions:
If an item set i contains an item of the form A → w • and A → w is rule m with m > 0 then the row for state i in the action table is completely filled with the reduce action rm.
The funny thing is, when I remove the rule
exp: mexp, I don't get any such conflicts.
So what I'm having trouble figuring out is, is this indeed a genuine problem in the grammar?
(In other words, is this grammar not, in fact, LR(0)?)
I don't believe this to be the case but I'm not sure.
If so, why? And if not, then what's wrong? (Is my table wrong, or am I doing something else incorrectly?)