24 Days of GHC Extensions: Bang Patterns

Over the last few days, we’ve been looking at various GHC extensions that centre around forming bindings. Today I’d like to look at one more extension in this area - bang patterns. Much like with record wildcards yesterday, the extension is small, yet extremely useful.

{-# LANGUAGE BangPatterns #-} import Data.Function (fix) (fix) import Data.List (foldl') (foldl')

Generally speaking, bang patterns allow us to annotate pattern matches to indicate that they should be strict. To understand this, we should start by understanding the interaction between pattern matching and Haskell’s evaluation strategy. When we are writing functions, any inputs to the function will not be evaluated until we pattern match on them. For example, the following contrived function doesn’t pattern match on its argument, so it doesn’t force any evaluation on it:

hello :: Bool -> String = "Hello." hello loud

If we apply hello to various arguments, the behaviour is the same - even for undefined values:

-> hello True "Hello." -> hello False "Hello." -> hello undefined "Hello." -> hello (fix id) "Hello."

However, by pattern matching on the Bool , we force evaluation of loud :

hello2 :: Bool -> String True = "Hello!" hello2 False = "hello" hello2

-> hello2 True "Hello!" -> hello2 False "hello" -> hello2 undefined *** Exception: Prelude.undefined -> hello2 (fix id) "*** Exception: <<loop>>

Specifically, the pattern match will evaluate the input argument enough to perform the pattern match - to determine which pattern is appropriate. Usually this would be evaluation to weak head normal form, but that’s not strictly true with nested pattern matches. For more of a discussion on this, interested readers are pointed to Simon Marlow’s book Parallel and Concurrent Programming in Haskell, which has a fantastic discussion on this.

But what does this all have to do with bang patterns? Bang patterns is an extension that will evaluate specific arguments to weak head normal form regardless of the pattern match performed. If we revisit our example hello function, rewriting it with bang patterns, we have

hello3 :: Bool -> String ! loud = "Hello." hello3loud

This function will now produce values only if loud evaluates to True or False :

-> hello3 True "Hello." -> hello3 False "Hello." -> hello3 undefined *** Exception: Prelude.undefined -> hello3 (fix id) "*** Exception: <<loop>>

So much for theory, but why would you want to do such a thing? Bang patterns are a fantastic extension when you don’t need Haskell’s implicit laziness. A common case is when performing computations over large lists of data. If we’re just summarising a list or collection, forcing the value at every step leads to considerably better memory usage, and that in turn leads to better performance. Johan Tibell - an expert in the realm of high performance haskell - has a lovely example of where bang patterns are useful, in this snippet for calculating the mean of a list of Double s:

mean :: [ Double ] -> Double = s / fromIntegral l mean xs where = foldl' step ( 0 , 0 ) xs (s, l)foldl' step () xs ! s, ! l) a = (s + a, l + 1 ) step (s,l) a(sa, l

Here we’re finding the mean of a list of numbers. If we kept this entirely lazy, we’ll build up a huge computation - a + b + c + d + e + ... and 0 + 1 + 1 + 1 + 1 + ... , for the entire length of the list! This is a horrible usage of memory, and we don’t need this laziness. It looks like using foldl' should be sufficient, but note that foldl' only evaluates to weak head normal form. In this case, that’s the pair of Double s but not the Double s themselves! Therefore we use bang patterns on s and l , forcing every step of the computation to evaluate the underlying Double .

It may be illuminating to consider the desugared version of the program:

mean :: [ Double ] -> Double = s / fromIntegral l mean xs where = foldl' step ( 0 , 0 ) xs (s, l)foldl' step () xs = let s' = s + a step (s, l) as' = l + 1 l' in s' `seq` l' `seq` (s', l') s'l'(s', l')

This program is equivalent in strictness, but as you can see - syntactically we had to do a lot more work to get there.

In conclusion, bang patterns are a lovely extension for working with high performance code. I particularly like that we can indicate strictness syntactically, which I find makes scanning through code to understand its evaluation strategy clearer than looking for seq s. Also, BangPatterns are so lightweight, when we are trying to optimise our program - often an inherently experimental process - it’s easy to swap out different variations on strictness.

This post is part of 24 Days of GHC Extensions - for more posts like this, check out the calendar.

You can contact me via email at ollie@ocharles.org.uk or tweet to me @acid2. I share almost all of my work at GitHub. This post is licensed under a Creative Commons Attribution-NonCommercial-NoDerivs 3.0 Unported License.