# How to determine whether a linked list contains a loop? [duplicate]

During a preparation for a job interview, I encountered the following question:

How can you determine whether a linked list (of any type) contains a loop, using additional space complexity of O(1)? You cannot assume that the loop starts at the first node (and of course, the loop doesn't have to contain all nodes).

I couldn't find the answer, though I have the feeling it's quite simple...

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I missed this exact question on an interview myself. I was only able to give the O(n) memory & time solution. –  Thanatos Jun 8 '10 at 22:25
I learned about this in a CS class, but I don't think it's a particularly good question since it's "only obvious if you already know". –  Brendan Long Jun 8 '10 at 22:26
Many, many duplicates, e.g. find whether a loop in a linked list without two pointers –  Paul R Jun 8 '10 at 22:33
Danny posted a good answer below -- if you want some search terms to learn more about it, try "Floyd's cycle detection algorithm" or "tortoise and hare algorithm". –  Jim Lewis Jun 8 '10 at 22:36

## marked as duplicate by Paul R, Jim Lewis, Ether, Matthew Flaschen, sthJun 9 '10 at 11:07

Easy. Maintain two pointers into the list. At each step, advance one pointer by a single link, and advance the other by two links. Test to see if they point to the same element. If so, you have a loop. If not, repeat until you find a loop or you reach the end of the list.

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I found that this solution was only "easy" if you knew it. This is, in my opinion, quite clever thinking. –  Thanatos Jun 8 '10 at 22:22
Interesting. Why bother advancing the other at all? –  T.E.D. Jun 8 '10 at 22:39
Any link may be equal to any other link, so they must both move around the list to test every (reachable) combination. –  Ether Jun 8 '10 at 22:54
@T.E.D: The first node of the list may not be part of the cycle. IFF a cycle exists, there will be some i such that X_i = X_2*i, and the tortoise and hare algorithm finds the smallest such i if it exists. –  Jim Lewis Jun 8 '10 at 22:59
Very creative :) –  ET. Jun 9 '10 at 6:44
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Probably the same technique as checking if a graph is a tree (trees don't get to have cycles), see this this question. It recommends either a topological sort or a depth first search.

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