How to express a filter that relies on adjacent elements in a list, functionally

Question

Several times I've wanted to traverse a list and pick out elements that have some property which also relies on, say, the next element in the list. For a simple example I have some code which counts how many times a function f changes sign over a specified interval [a,b]. This is fairly obvious in an imperative language like C:

for(double x=a; x<=b; x+=(b-a)/n){
    s*f(x)>0 ? : printf("%e %e\n",x, f(x)), s=sgn(f(x));
    }

In Haskell my first instinct was to zip the list with its tail and then apply the filter and extract the elements with fst or whatever. But that seems clumsy and inefficient, so I shoehorned it into being a fold:

signChanges f a b n = tail $       
    foldl (\(x:xs) y -> if (f x*f y)<0 then y:x:xs else x:xs) [a] [a,a+(b-a)/n..b]

Either way I feel there is a "right" way to do this (as there so often is in Haskell) and that I don't know (or just haven't realised) what it is. Any help with how to express this in a more idiomatic or elegant way would be greatly appreciated, as would advice on how, in general, to find the "right" way to do things.

Answer 1

Here is a "version" using a paramorphism (not quite the same as the question - but it should illustrate a paramorphism usefully enough), first we need para as it is not in the standard libraries:

-- paramorphism (generalizes fold)
para :: (a -> ([a], b) -> b) -> b -> [a] -> b
para phi b = step
  where step []     = b
        step (x:xs) = phi x (xs, step xs)

Using a paramorphism is much like using a fold but as well as seeing the accumulator we can see the rest of input:

countSignChanges :: [Int] -> Int
countSignChanges = para phi 0
  where
    phi x ((y:_),st)  = if signum x /= signum y then st+1 else st
    phi x ([],   st)  = st


demo = countSignChanges [1,2,-3,4,-5,-6] 

The nice thing about para compared to zipping against the tail is that we can peek as far as we want into the rest of input.

Answer 2

Zipping is efficient if you run with -O2 as list fusion engages. No need to resort to folds in this case is one of essential advantages of Haskell as it improves modularity.

So zipping is the right way to do it.

Answer 3

if you need to calculate value for i-th element, but depending on j-th element of the list, it's better to convert list to Array, either mutable or immutable.

So you will be able to do arbitrary computation based on index of current element either in fold, or in recursive calls.