# How to append the current list with another element in Scheme?

Let's say I have a list: a b a a a c e. I want to get rid of all adjacent duplicate, i.e. the two a's in the middle. So the list becomes a b a c e.

The algorithm that I current have in mind is,
- Check if the current value is equal to the next value by

(equal? (car lst) (car (cdr lst)))

If they are equal then I want to skip the duplicate element, but I don't know how to achieve this behavior in Scheme? Any idea?
- If they're not equal, keep traversing through the list.

By the way, is there a way to implement iterative for loop in Scheme for these types of problem? Because I feel recursion is just overkill for this simple problem.

Thanks,

-
Scheme has no for loop by default. But SRFI 1 provides fold, which is the standard way to iteratively compress a list to a single value. (There's also map, which is the standard way to process each element in a list, returning the results in a new list.) –  Chris Jester-Young Apr 21 '11 at 2:35

## 3 Answers

Here's an iterative answer for this problem using fold:

(define (uniq lst)
(fold (lambda (elem result)
(if (and (pair? result) (equal? elem (car result)))
result
(cons elem result)))
'() (reverse lst)))

(In future, any time you're trying to convert a list to something, consider using fold, and any time you're trying to convert something to a list, consider using unfold. They're very powerful functions!)

-
@Chris Jester-Young: Thanks for a nice solution. I will try to use fold from now on. –  Chan Apr 21 '11 at 2:50
@Chris Jester-Young: Hm, there are no fold and unfold in DrScheme. Do I need to include some libraries? –  Chan Apr 21 '11 at 2:54
@Chan: (require srfi/1) should do the trick. –  Chris Jester-Young Apr 21 '11 at 2:59
There are two flavors of 'fold' in DrRacket/DrScheme: foldl and foldr. For 'unfold', I believe you'll have to go to SRFI-1. The meta-answer to your problem, though, is this: documentation! Try typing 'unfold' and hitting the F1 key; you should get a nice long help list. –  John Clements Apr 21 '11 at 3:00
@Chan: If you're following @John's suggestion to use foldl and foldr (which are the Racket names for fold and fold-right respectively), note that my solution uses foldl (since that's iterative). foldr is recursive, but allows you to remove the call to reverse. –  Chris Jester-Young Apr 21 '11 at 3:02

I have not written Scheme for a long time, but maybe this will be helpful to you:

(define (remove-adjacent-duplicates list)
(if (empty? list)
'()
(if (equal? (car list) (cadr list))
(remove-adjacent-duplicates (cdr list))
(cons (car list) (remove-adjacent-duplicates (cdr list)))))

Oh, and don't be afraid of recursion, especially in Scheme. It's fun! :)

-
Oops, you need to check whether (cdr lst) is null, before you use (cadr lst). :-) –  Chris Jester-Young Apr 21 '11 at 2:02
@Robert Kolner: Thanks for the solution. In fact, the reason I studied Scheme is just Recursion, however it's a little strange for some circumstances where iteration is more meaningful. I don't want to be a recursive zealot, because it will affect my way of thinking in ordinary languages. –  Chan Apr 21 '11 at 2:49
@Robert Kolner: There is no cadr in my DrScheme :( –  Chan Apr 21 '11 at 2:59
That's right: functional programming is a VIRUS that will INFECT YOUR BRAIN. After learning to program in a functional language, using an imperative one will make you weep and cry. (Not actually joking all that much....) –  John Clements Apr 21 '11 at 3:01
@John: Iteration-vs-recursion is orthogonal to functional-vs-imperative. I often code functionally, but still prefer iteration (tail recursion) to straight-up recursion, when it suits the problem at hand. :-) –  Chris Jester-Young Apr 21 '11 at 3:04

In this case you would want to save the car of the cdr to cons onto the result of your recursive call (ditch the car, it makes checking in a case with like 3 a's easier). Now the question you are asking is what is the recursive call on. Well, now you cons the car of the cdr onto the recurion on the cdr.

-
I think Robert Kolner's answer is clearer than mine. –  Ross Larson Apr 21 '11 at 1:41