Earley
Go to the API documentation on Hackage.
This (Text.Earley) is a library consisting of a few main parts:
An embedded contextfree grammar (CFG) domainspecific language (DSL) with
semantic action specification in applicative style.
An example of a typical expression grammar working on an input tokenised
into strings is the following:
expr :: Grammar r (Prod r String String Expr)
expr = mdo
x1 < rule $ Add <$> x1 <* namedToken "+" <*> x2
<> x2
<?> "sum"
x2 < rule $ Mul <$> x2 <* namedToken "*" <*> x3
<> x3
<?> "product"
x3 < rule $ Var <$> (satisfy ident <?> "identifier")
<> namedToken "(" *> x1 <* namedToken ")"
return x1
where
ident (x:_) = isAlpha x
ident _ = False
An implementation of (a modification of) the Earley parsing algorithm.
To invoke the parser on the above grammar, run e.g. (here using words
as a
stupid tokeniser):
fullParses (parser expr) $ words "a + b * ( c + d )"
= ( [Add (Var "a") (Mul (Var "b") (Add (Var "c") (Var "d")))]
, Report {...}
)
Note that we get a list of all the possible parses (though in this case
there is only one).
Another invocation, which shows the error reporting capabilities (giving the
last position that the parser reached and what it expected at that point),
is the following:
fullParses (parser expr) $ words "a +"
= ( []
, Report { position = 2
, expected = ["(","identifier","product"]
, unconsumed = []
}
)
Functionality to generate the members of the language that a grammar generates.
To get the language of a grammar given a list of allowed tokens, run e.g.:
language (generator romanNumeralsGrammar "VIX")
= [(0,""),(1,"I"),(5,"V"),(10,"X"),(20,"XX"),(11,"XI"),(15,"XV"),(6,"VI"),(9,"IX"),(4,"IV"),(2,"II"),(3,"III"),(19,"XIX"),(16,"XVI"),(14,"XIV"),(12,"XII"),(7,"VII"),(21,"XXI"),(25,"XXV"),(30,"XXX"),(31,"XXXI"),(35,"XXXV"),(8,"VIII"),(13,"XIII"),(17,"XVII"),(26,"XXVI"),(29,"XXIX"),(24,"XXIV"),(22,"XXII"),(18,"XVIII"),(36,"XXXVI"),(39,"XXXIX"),(34,"XXXIV"),(32,"XXXII"),(23,"XXIII"),(27,"XXVII"),(33,"XXXIII"),(28,"XXVIII"),(37,"XXXVII"),(38,"XXXVIII")]
The above example shows the language generated by a Roman numerals
grammar limited to the tokens 'V'
, 'I'
, and
'X'
.
Helper functionality for creating parsers for expressions with mixfix
identifiers in the style of Agda.
How do I write grammars?
As hinted at above, the grammars are written inside Grammar
, which is a
Monad
and MonadFix
. For the library to be able to tame the recursion in
the grammars, we have to use the rule
function whenever a production is
recursive.
Whenever you would write e.g.
...
p = foo <> bar <*> p
...
in a conventional combinator parser library, you instead write the following:
grammar = mdo
...
p < rule $ foo <> bar <*> p
...
Apart from making it possible to do recursion (even leftrecursion), rule
s
have an additional benefit: they control where work is shared, by the rule that
any rule
is only ever expanded once per position in the input string. If a
rule
is encountered more than once at a position, the work is shared.
Compared to parser generators and combinator libraries
This library differs from the main methods that are used to write parsers in
the Haskell ecosystem:

Compared to parser generators (YACC, Happy, etc.) it requires very little
preprocessing of the grammar. It also allows you to stay in the host
language for both grammar and parser, i.e. there is no use of a separate
tool. This also means that you are free to use the abstraction facilities of
Haskell when writing a grammar. Currently the library requires a linear
traversal of the grammar's rules before use, which is usually fast enough to
do at run time, but precludes infinite grammars.

The grammar language is similar to that of many parser combinators (Parsec,
Attoparsec, parallel parsing processes, etc.), providing an applicative
interface, but the parser gracefully handles all finite CFGs, including those
with leftrecursion. On the other hand, its productions are not monadic
meaning that it does not support contextsensitive or infinite grammars,
which are supported by many parser combinator libraries.
Note: The Grammar
type is a Monad
(used to provide observable sharing)
but it lives a layer above productions. It cannot be used to decide what
production to use depending on the result of a previous production, i.e. it
does not give us monadic parsing.
The parsing algorithm
The parsing algorithm that this library uses is based on Earley's parsing
algorithm. The algorithm has
been modified to produce online parse results, to give good error messages, and
to allow garbage collection of the item sets. Essentially, instead of storing a
sequence of sets of items like in the original algorithm, the modified
algorithm just stores pointers back to sets of reachable items.
The worstcase run time performance of the Earley parsing algorithm is cubic in
the length of the input, but for large classes of grammars it is linear. It
should however be noted that this library will likely be slower than most
parser generators and parser combinator libraries.
The parser implements an optimisation similar to that presented in Joop M.I.M
Leo's paper A general contextfree parsing algorithm running in linear time on
every LR(k) grammar without using lookahead, which removes indirections in
sequences of nonambiguous backpointers between item sets.
For more indepth information about the internals of the library, there are
implementation notes currently being written.
Olle Fredriksson  https://github.com/ollef