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suppose we have doubly linked list ordered by integer value:

struct ListItem
  int value;
  ListItem *prev, *next;

struct List
  ListItem *first, *last;
  int count;

can we use faster search algorithm such as binary search to locate ListItem inside List and how?

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Sounds like homework. Please add homework tag and/or word "homework" in title. –  Cheers and hth. - Alf Jul 10 '11 at 15:46
no it's not homework –  Muhammad alaa Jul 10 '11 at 15:53
writing multi-language source files is hard. I suggest you stick to one of C or C++. –  pmg Jul 10 '11 at 15:58

5 Answers 5

up vote 4 down vote accepted

For most practical purposes, no. If you want faster search, a linked list is a poor choice of data structure. Consider a vector, deque, set, or multiset instead.

Edit: Perhaps it would be good to provide some guidance about which of those makes sense when. A vector makes the most sense if you have two basically separate phases: Either you insert all your data in order, or you insert and sort, then after the data is sorted, the data remains static, and you just search in it. A deque is pretty much the same, except you can insert at either end, so if you might get data out of order, but new data always belongs at one end of the collection or the other, it can be a good choice.

A set or multiset works better if you're going to be mixing insertions/deletions with lookups. It stays sorted all the time, so searches are always reasonably fast. Between the two (set vs. multiset) the choice is pretty simple: if you need to ensure each item in the collection is unique, you want set. If you might have more than one item with the same key, you want a multiset.

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I'm writing a hash table for big data set, the hash table is using separate chain method and using vector will be a bad choice because of memory reallocation –  Muhammad alaa Jul 11 '11 at 12:24
@Muhammad: I'm not sure I follow how memory reallocation should make a big difference in this case. In any case, for a hash table your method of searching the collision chains should rarely make much difference. Short of a pathological hash function or grossly incorrect guess about overall size, you should rarely be searching more than a few items (typically ~3). With that small of a collection to search, linear vs. binary search makes almost no difference at all. –  Jerry Coffin Jul 11 '11 at 14:43

If there is no ordering among the nodes based on there values, no other choice remains but to check all individually. Hence O(n).

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Yes, you can, but unless operation of "compare values" is far costlier than "move pointer" it makes entirely no sense. Since usually "move" is about as costly as "compare", with plain search:

  • O(N) moves
  • O(N) comparisons

with binary:

  • O(N) moves to determine size of the list
  • O(N) moves to locate the element
  • O(log(N)) comparisons.

In your example, value is "int", which means comparison is even cheaper than movement, so the binary algorithm will be much more expensive.

If you know the size of the list, binary might (arguably) get cheaper, but the added complexity of 2-directional logic travel and element-counting will kill any benefit from reduced number of value comparisons.

Of course if you need to search multiple times, the easiest approach will be to transform the linked list into an array or create an index - an array of pointers. And in case the value is something far more sophisticated than int and much more difficult to compare, of course the faster algorithms will be most desired.

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Well, you'll still have to cycle through all the elements up to the middle element. I'm not really sure if the binary search would speed up the search through a linked list or not because of this. In the case for example, your element is before the middle element, it would seem faster logically to just cycle through those elements. Otherwise, you're just going to go to the middle, see where your element is in relation to that, then cycle again and yea...the cycling is what would really kill this. I guess it would also depend on exactly where in the list your element falls.

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If you only have to perform the search for a couple of times, I suspect searching through the list from start to end would be the best choice. There may be some algorithms that can be more efficient, but it would only be slightly better.

If, however, you have to perform the search for many times, copying the list into an ordered, random-access container that support binary search would be the way to go.

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