# Function substitute

How can I do a function (recursivily) that substitute the argument b(1) for an argument a(0) on a list? For example:

``````    substitute 0 1 [1,0,3,0,4,0,0]
[1,1,3,1,4,1,1]
``````

Thanks.

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The simplest is to use list comprehension:

`subst a b xs = [c | x<-xs, let c=if x==a then b else x]`.

But that's no recursion. With recursion, it is just a case analysis for list structure (i.e. structural recursion):

``````subst a b [] = []
subst a b (x:xs)
| x==a      = b:subst a b xs
| otherwise = x:subst a b xs
``````

which is an instance of the `foldr` (or `map`) pattern:

``````subst a b = foldr (\x xs-> (if x==a then b else x) : xs) []
subst a b = map   (\x   ->  if x==a then b else x      )
``````

It is usually advisable to use a "worker" function in recursive definitions, like so:

``````subst a b xs = go xs
where
go [] = []
go (x:xs)
| x==a      = b:go xs
| otherwise = x:go xs
``````

but if you stare at it for a moment you recognize that it is follows the `map` pattern. In Haskell recursive patterns are captured by higher-order functions, like `map`, `filter` etc.

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No recursion required!

``````substitute :: Eq a => a -> a -> [a] -> [a]
substitute old new = map subs where
subs x | x == old  = new
| otherwise = x
``````

If this is homework, you can easily substitute in the definition of `map` (which is recursive).

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