# Is it possible to express chainl1 using applicative?

Is it possible to express the chainl1 combinator from Parsec not using the Monad instance defined by parsec?

chainl1 p op =
do x <- p
rest x
where
rest x = do f <- op
y <- p
rest (f x y)
<|> return x
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Yes, it is:

chainl1 p op = foldl (flip (\$)) <\$> p <*> many (flip <\$> op <*> p)

The idea is that you have to parse p (op p)* and evaluate it as (...(((p) op p) op p)...).

It might help to expand the definition a bit:

chainl1 p op = foldl (\x f -> f x) <\$> p <*> many ((\f y -> flip f y) <\$> op <*> p)

As the pairs of op and p are parsed, the results are applied immediately, but because p is the right operand of op, it needs a flip.

So, the result type of many (flip <\$> op <*> p) is f [a -> a]. This list of functions is then applied from left to right on an initial value of p by foldl.

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Would you care to explain a little bit more? Why the foldl and flip? –  adamse Oct 11 '11 at 6:48

Ugly but equivalent Applicative definition:

chainl1 p op =
p <**>
rest
where
rest = flip <\$> op <*>
p <**>
pure (.) <*> rest
<|> pure id

Instead of passing of left-side argument x explicitly to the right-hand side op, this Applicative form 'chains' op's partially applied to their right-side argument (hence flip <\$> op <*> p) via lifted combinator (.) and then applies the leftmost p via (<**>) to the resulting rest :: Alternative f => f (a -> a).

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When I try this with chainl1 (read <\$> many digit) ((+) <\$ char '+' <|> (*) <\$ char '*') on "1+2*3+4" I get 17 instead of 13. –  Sjoerd Visscher Oct 11 '11 at 15:40
It needs flip (.) instead of (.), then it works ok. –  Sjoerd Visscher Oct 11 '11 at 15:46