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There seems to be a consensus that you should use Parsec as an applicative rather than a monad. What are the benefits of applicative parsing over monadic parsing?

  • style
  • performance
  • abstraction

Is monadic parsing out?

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5 Answers

up vote 40 down vote accepted

The main difference between monadic and applicative parsing is in how sequential composition is handled. In the case of an applicative parser, we use (<*>), whereas with a monad we use (>>=).

(<*>) :: Parser (a -> b) -> Parser a -> Parser b
(>>=) :: Parser a -> (a -> Parser b) -> Parser b

The monadic approach is more flexible, because it allows the grammar of the second part to depend on the result from the first one, but we rarely need this extra flexibility in practice.

You might think that having some extra flexibility can't hurt, but in reality it can. It prevents us from doing useful static analysis on a parser without running it. For example, let's say we want to know whether a parser can match the empty string or not, and what the possible first characters can be in a match. We want functions

empty :: Parser a -> Bool
first :: Parser a -> Set Char

With an applicative parser, we can easily answer this question. (I'm cheating a little here. Imagine we have a data constructors corresponding to (<*>) and (>>=) in our candidate parser "languages").

empty (f <*> x) = empty f && empty x
first (f <*> x) | empty f   = first f `union` first x
                | otherwise = first f

However, with a monadic parser we don't know what the grammar of the second part is without knowing the input.

empty (x >>= f) = empty x && empty (f ???)
first (x >>= f) | empty x   = first x `union` first (f ???)
                | otherwise = first x

By allowing more, we're able to reason less. This is similar to the choice between dynamic and static type systems.

But what is the point of this? What might we use this extra static knowledge for? Well, we can for example use it to avoid backtracking in LL(1) parsing by comparing the next character to the first set of each alternative. We can also determine statically whether this would be ambiguous by checking if the first sets of two alternatives overlap.

Another example is that it can be used for error recovery, as shown in the paper Deterministic, Error-Correcting Combinator Parsers by S. Doaitse Swierstra and Luc Duponcheel.

Usually, however, the choice between applicative and monadic parsing has already been made by the authors of the parsing library you're using. When a library such as Parsec exposes both interfaces, the choice of which one to use is purely a stylistic one. In some cases applicative code is easier to read than monadic code and sometimes it's the other way round.

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+1 Nice, detailed answer. –  pelotom Oct 22 '11 at 23:53
3  
Wait! I had thought the same until today, when it occurred to me that the empty test can be applied to monadic parsers as well. The reason is that we can get the value you named ??? by applying the parser x on the empty string. More generally, you can just feed the empty string into the parser and see what happens. Likewise, the set of first characters can be obtained at least in a functional form first :: Parser a -> (Char -> Bool). Of course, converting the latter to Set Char would involve an inefficient enumeration of characters, that's where applicative functors have the edge. –  Heinrich Apfelmus Apr 21 '12 at 8:12
2  
@HeinrichApfelmus You cannot get answer to empty that way. Or you can, but it's like giving answer to [en.wikipedia.org/wiki/Halting_problem] with "lets run the program and see if it halts". –  Oleg Grenrus Jul 17 '13 at 12:33
3  
@hammar: what if we run let x = pure f <*> y <*> x in empty x. If empty y is False, then computation doesn't terminate... just to point out, that it's not that simple. –  Oleg Grenrus Jul 17 '13 at 12:38
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The main reason I can see to prefer applicative parsers over monadic parsers is the same as the main reason to prefer applicative code over monadic code in any context: being less powerful, applicatives are simpler to use.

This is an instance of a more general engineering dictum: use the simplest tool which gets the job done. Don't use a fork lift when a dolly will do. Don't use a table saw to cut out coupons. Don't write code in IO when it could be pure. Keep it simple.

But sometimes, you need the extra power of Monad. A sure sign of this is when you need to change the course of the computation based on what has been computed so far. In parsing terms, this means determining how to parse what comes next based on what has been parsed so far; in other words you can construct context-sensitive grammars this way.

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No, "use the simplest tool" may seem like a good rule of thumb, but actually is not. E.g., we use computer for writing letters, however computer to a sheet of paper is something like a table saw compared to a pair of scissors. –  Valentin Golev Dec 6 '12 at 16:29
    
I mean, there are always upsides and downsides for every choice, but mere simplicity is a bad basis for a choice. Especially when you're deciding whether to use Haskell. :D –  Valentin Golev Dec 6 '12 at 16:31
    
Yes, you're right. It would be better to say something like, "the right tool is the one which is maximally efficient while being minimally complex." What's missing from my description is the part about efficiency: you want a tool which is sufficiently powerful not just to do the job, but to make the job as easy as possible. But at the same time you don't want a tool which has lots of bells and whistles not applicable to the task at hand, since these most likely increase the complexity of operating it to no benefit. –  pelotom Dec 6 '12 at 20:42
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If a parser is purely applicative, it is possible to analyse its structure and "optimise" it before running it. If a parser is monadic, it's basically a Turing-complete program, and performing almost any interesting analysis of it is equivalent to solving the halting problem (i.e., impossible).

Oh, and yes, there's a stylistic difference too...

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With Parsec the benefit of using Applicative is just style. Monad has the advantage that it is more powerful - you can implement context sensitive parsers.

Doaitse Swierstra's UU parsing is more efficient if used only applicatively.

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ISTR that formally, because Haskell allows infinite grammars, monad does not actually increase the number of recognizable languages. –  luqui Oct 22 '11 at 19:13
1  
@luqui I'm curious about your comment. Here's a language. The alphabet is Haskell Strings, and the language is the set of words in which all the letters are equal. This is dead easy as a monadic parser: option [] (anyToken >>= many . exactToken) (where here anyToken and exactToken aren't actually a part of the Parsec library, but probably ought to be; ask me if you're unsure of what they do). How would the corresponding applicative parser look? –  Daniel Wagner Oct 22 '11 at 21:15
1  
@stephen, can you give a reference for context sensitive parsers? I'm curious what is the exact power of monadic and applicative parsers. –  sdcvvc Oct 22 '11 at 21:47
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@sdcvvc: this paper discusses the relative power of arrow parsers vs. monadic parsers and points out that monadic parsers enable parsing context-sensitive grammars while arrows do not. I believe applicative parsers would be strictly less powerful than arrow parsers. –  pelotom Oct 22 '11 at 23:06
2  
This post (and the comments) explains that applicative parsers allow parsing all recursively enumerable languages: byorgey.wordpress.com/2012/01/05/… –  Blaisorblade Dec 17 '12 at 3:04
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Monads are strictly a more featureful abstraction than Applicatives. You could write

instance (Monad m) => Applicative m where
  pure  = return
  (<*>) = ap

But there is no way to write

instance (Applicative a) => Monad a where
  return = pure
  (>>=) = ???

So yes, it is essentially a matter of style. I imagine if you use return and ap, then there should be no performance loss over using pure and <*>.

Is monadic parsing out?

Since Monads are a subset of Applicatives, I would conclude that applicative parsing is a subset of monadic parsing.

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Did you mean to say that Monads are a superset of Applicatives? –  Guildenstern Nov 8 '13 at 17:10
    
@Guildenstern Monadic operations are a superset of Applicative operations. But said another way: types have an instance of Monad are a subset of types that have an instance of Applicative. When speaking of "Monads" and "Applicatives," one is usually referring to the types, not the operations. –  Dan Burton Nov 8 '13 at 17:37
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