# Scheme fold map and filter functions

I am learning how to use higher-order functions in scheme. I get the idea of using higher-order functions, however I am having trouble using them. For this learning exercise, I would prefer to only use some combination of filter, fold, and/or map.

For example, I want to construct the set difference between two lists call them A and B. I am defining set difference as x such that x is an element of A but x is not an element of B. I only want to use the functions map, filter and fold. For example:

Let A = (1 8 6 2)

Let B = (5 7 9 1 6)

The set difference of A and B would be (8 2)

The idea is to construct a new list by iterating over the elements of A and seeing if an element of A equals an element of B, if so don't add a to the new list; otherwise add a to the new list.

My algorithm idea goes something like this:

Let neq be "not equal to"

1. For each a in A and b in B evaluate the expression: `(neq? a b)`

For a = 1 we have:

(and (neq? 1 5) (neq? 1 7) (neq? 1 9) (neq? 1 1) (neq ? 1 6))

2. If this expression is true then a goes in the new list; otherwise don't add a to the new list. In our example `(neq? 1 1)` evaluates to false and so we do not add 1 to the new list.

Pretty much my entire procedure relies on 1, and this is where I have a trouble.

1. How do I do step 1?
2. I see that in step 1 I need some combination of the `map` and `fold` functions, but how do I get the `and a neq b` distributed?

EDIT This is the closest sample I have:

``````(fold-right (trace-lambda buggy (a b c) (and (neq? a b))) #t A B)
|(buggy 3 5 #t)
|#t
|(buggy 2 4 #t)
|#t
|(buggy 1 1 #t)
|#f
#f
``````

The above shows a trace of my anonymous function attempting to perform the (and (neq? a b)) chain. However, it only performs this on elements in A and B at the same position/index.

All help is greatly appreciated!

-
`fold` will always evaluate all the applications along the list, in Scheme, and no short-circuiting is possible. `ormap` is a much better fit here. `fold-right` has the additional drawback of not being tail recursive (unlike `fold-left`). :) – Will Ness Feb 4 '13 at 17:18

A simplified version of `member` is easy to implement using `fold`, of course:

``````(define (member x lst)
(fold (lambda (e r)
(or r (equal? e x)))
#f lst))
``````

Now, with that, the rest is trivial:

``````(define (difference a b)
(filter (lambda (x)
(not (member x b)))
a))
``````

If you want to amalgamate all that into one function (using your `neq?`), you can do:

``````(define (difference a b)
(filter (lambda (x)
(fold (lambda (e r)
(and r (neq? e x)))
#t b))
a))
``````
-
This definition of `member` won't short-circuit on the first match, though. – Will Ness Feb 4 '13 at 18:08
@WillNess It also doesn't return the item being matched, only true or false. But it serves the OP's purpose well enough. – Chris Jester-Young Feb 4 '13 at 19:02
@WillNess Also (while you're here), the default avatar generation system isn't Gravatar's fault; SO chose to use identicons for default avatars. If you need to blame something, blame the identicon algorithm. – Chris Jester-Young Feb 4 '13 at 19:08
Hi, thanks for your response. For your 1st, you're absolutely right. For the 2nd, I don't need to blame anyone, I want to be spared the pain of seeing the occasional high-resemblance graphics. I wrote to SO, they said it's Gravatar that's producing the identicon. Gravatar uses the algorithm which produces rotational-4-symmetry figures which are bound to resemble the xxx with high probability. They could use another, but that's the one they stick with. Even just mirroring one of the quadrants would be enough. – Will Ness Feb 5 '13 at 10:18

In Haskell, `fold` is capable of short-circuiting evaluation because of lazy evaluation.

But in Scheme it is impossible. That's why in Racket e.g., there's a special function supplied for that, `ormap`, which is capable of short-circuiting evaluation. IOW it is a special kind of `fold` which must be defined explicitly and separately in Scheme, because Scheme is not lazy. So according to your conditions I contend it is OK to use it as a special kind of `fold`.

Using it, we get

``````(define (diff xs ys)
(filter
(lambda (y)
(not (ormap (lambda (x) (equal? x y))     ; Racket's "ormap"
xs)))
ys))
``````

If your elements can be ordered, it is better to maintain the sets as ordered (ascending) lists; then `diff` can be implemented more efficiently, comparing head elements from both lists and advancing accordingly, working in linear time.

-

Using Racket:

``````(define A '(1 8 6 2))

(define B '(5 7 9 1 6))

(filter-not (lambda (x) (member x B)) A)

==> '(8 2)
``````
-
Sorry, I forgot to mention that I do not want to use member, only some combination of map, fold, and/or filter. – CodeKingPlusPlus Feb 3 '13 at 3:15
@CodeKingPlusPlus `(filter-not g xs)` == `(filter (lambda(x)(not (g x))) xs)`. – Will Ness Feb 4 '13 at 17:37