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In Haskell, I often write expressions with $'s. I find it quite natural and readable, but I sometimes read it is bad form and do not understand why it should be.

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Do you have a reference for where it is described as bad form? –  bobbymcr Dec 23 '11 at 17:19
Short answer: no. –  Dan Burton Dec 23 '11 at 22:21

1 Answer 1

up vote 22 down vote accepted

The following are all good form:

foo = bar . baz . quux
foo x = bar . baz . quux $ x
foo x = (bar . baz . quux) x
foo x = bar (baz (quux x))

I've put them in rough order of my preference, though as always taste varies, and context may demand a different choice. I've also occasionally seen

foo = bar
    . baz
    . quux

when each of the bar, baz, and quux subexpressions are long. The following is bad form:

foo x = bar $ baz $ quux $ x

There are two reasons this is less preferable. First, fewer subexpressions can be copied and pasted into an auxiliary definition during refactoring; with all ($) operators, only subexpressions that include the x argument are valid refactorings, whereas with (.) and ($) operators even subexpressions like bar . baz or baz . quux can be pulled out into a separate definition.

The second reason to prefer (.) is in anticipation of a possible change to the fixity of ($); currently, ($) is infixr, meaning it associates to the right, like so:

foo x = bar $ (baz $ (quux $ x))

However, ($) would be useful in more expressions if it were infixl; for example, something like

foo h = f (g x) (h y)
foo h = f $ g x $ h y
foo h = (f $ g x) $ h y

...which currently cannot be expressed without parentheses. The "bad form" example, when parsed with an infixl application, would be

foo x = ((bar $ baz) $ quux) $ x

which means something significantly different. So, future-proof your code by avoiding this form.

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I've also occasionally seen things like bar . baz $ quux x or bar (baz . quux $ x) or other mixtures, typically when other infix operators are involved, or when specific function applications are being conceptually emphasized. –  C. A. McCann Dec 23 '11 at 17:37
IMO, the fixity argument is less compelling than the fact that the compositional style lets you refactor the pipeline into a function with a simple cut-and-paste. –  ehird Dec 23 '11 at 18:45
With its current fixity, if you have bar $ baz $ quux $ x, this is equivalent to bar . baz . quux $ x. The latter is, of course, encouraged over the former. –  Dan Burton Dec 23 '11 at 22:23
I really can't see the precedence or fixity of $ changing - the point of $ is to have low precedence and you can't get lower than 0, so f $ g $ h x is fine. Personally I dislike f . g . h $ x as it uses two operators (so two concepts - composition and application) when the $ form just uses one. –  stephen tetley Dec 23 '11 at 23:05
@stephentetley Is it more clear to say the associativity of ($) might change? As you say, the precedence level is right where it ought to be. –  Daniel Wagner Dec 23 '11 at 23:18

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