# LISP check if list is symmetrical without reverse

Anyone have any ideas on how to do this... reverse is too slow, and I want to avoid using the function.

Basically I want to be able to return true if something like '(a b b a) comes up or '(a b c d c b a)

and false for something not symmetrical

• Looks like homework. – starblue Sep 15 '09 at 12:39

I'm not sure why using `REVERSE` is insufficiently efficient; have you actually profiled the solution? You just traverse the list once to do it; same as (say) finding the length of the list, and then you can traverse the two lists once to compare.

If you wanted to be a little fancier, you could simultaneously find the length of the list and reverse it using `LOOP` as so:

``````(defun fancier-palindrome-p (list)
(let ((reversed '()) (length 0))
(dolist (elt list)
(incf length)
(push elt reversed))
(dotimes (i (floor length 2) t)
(unless (eql (pop list) (pop reversed))
(return nil)))))
``````

This allows you to skip half the checks. I don't think this is worth the additional complexity. You can also use move down the list with a tortoise and hare to save half the consing at the cost of even more complexity.

`````` (defun ridiculous-palindrome-p (list)
(let ((reversed-front '()))
(loop
:for tortoise :on list
:for hare :on list :by #'cddr
:until (null (cdr hare))
:do (push (car tortoise) reversed-front)
:finally
(return
(if (null hare) ; length is even
(equal tortoise reversed-front)
(equal (cdr tortoise)
reversed-front))))))
``````

Neither of these solutions strikes me as more compelling than

``````(defun palindrome-p (list) (equal list (reverse list))
``````

If this really is a bottleneck, perhaps you'd be better off using vectors as your sequence representation to take advantage of the fast random access, like so:

``````(defun vector-palindrome-p (vector)
(let* ((n (length vector)) (j n))
(dotimes (i (floor n 2) (return t))
(unless (eql (aref vector i)
(aref vector (decf j)))
(return nil)))))
``````

Isn't this a good solution? Or you could search for other solutions by using "palindrome lisp" as keywords in your favorite search engine.

• this conses quadratically in the length of the list, while the simple (equal list (reverse list)) conses linearly. – sds Nov 13 '12 at 22:32

This function avoids using reverse:

``````(defun palindromp (a)
(or (null a)
(null (cdr a))
(and (equal (car a) (car (last a)))
(palindromp (butlast (cdr a))))))
``````
• this conses quadratically, which is worse than reverse, which conses linearly. – sds Nov 13 '12 at 22:30
• I know :-) But I think the OP is asking too much: using reverse is about the best that can be done with linked lists. My answer is almost a joke: yes, it avoids reverse, but at some price... At least I find it quite elegant, not even using "if" (before macroexpansion !) – user1220978 Nov 14 '12 at 15:42

Here is the CommonLisp:

``````(defun pali (l)
(labels ((scan (v n l)
(or (>= n (/ l 2))
(and (equal (elt v n) (elt v (- l n 1)))
(scan v (+ n 1) l)))))
(scan (apply #'vector l) 0 (length l))))
``````

Have you used '`labels`' before!? Here you go (in Scheme):

``````(define (palindrome? l)
(let scanning ((v (list->vector l)) (n 0) (len (length l)))
(or (>= n (/ len 2))
(and (equal? (vector-ref v n) (vector-ref v (- len n 1)))
(scanning v (+ n 1) len)))))
``````
``````(defun   pal()

(format t "enter list")

(print list1)

(setf list2(rev list1))

(if (equal list1 list2)

(print "palindrome")

(print "not palindrome")))

(reverse (list1)

(setf list2 nil)

(do ((i 1 (+ i 1)))((equal list1 nil)

(format t "reverse list")

(print list2))

(setf list2 (cons (car list1) list2))

(setf list1 ( cdr list1))))
``````
• Please don't simply post the code. Give some explanation or information or usage about your code. For example, see this answer. – Azik Abdullah Jan 8 '14 at 6:12