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What are the advantages of binary search trees over hash tables?

Hash tables can look up any element in Theta(1) time and it is just as easy to add an element....but I'm not sure of the advantages going the other way around.

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for hash tables what are the running times for find() insert() and remove()? theta(1) theta(1) and theta(1) right? –  Devoted Nov 8 '10 at 22:13
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Almost always, yes. If you run into a lot of collisions, then those times might grow up to O(n). –  Christian Mann Nov 8 '10 at 22:16
    
These times also depend on your hashing function. If for some strange reason it's not O(1), obviously your operations will have a minimum bound of whatever efficiency your hash function runs at. –  Christian Mann Nov 9 '10 at 2:36
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14 Answers

up vote 19 down vote accepted

Remember that Binary Search Trees (reference-based) are memory-efficient. They do not reserve more memory than they need to.

For instance, if a hash function has a range R(h) = 0...100, then you need to allocate an array of 100 (pointers-to) elements, even if you are just hashing 20 elements. If you were to use a binary search tree to store the same information, you would only allocate as much space as you needed, as well as some metadata about links.

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It is not true that the entire range of hash function outputs have to exist in the array. The hash values can simply be modded by the length of the array to allow a smaller array. Of course, the ultimate number of elements being added may not be known, so the hash table may still allocate more space than is necessary. Binary search trees can waste just as much memory or more, though. Linked implementations need space for at least two additional pointers per element (three if using a parent pointer), and array-based BST's can waste a lot of memory for unfilled portions of the tree. –  Solaraeus Jul 11 '12 at 22:28
    
@Solaraeus: Array-based BST's are the best to compare to hash tables and they are no more wasteful than hash tables. You can also expand a BST with little more than a memory copy, compared to recomputing the whole table. –  Guvante Sep 20 '12 at 18:11
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One "advantage" of a binary tree is that it may be traversed to list off all elements in order. This is not impossible with a Hash table but is not a normal operation one design into a hashed structure.

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traversing in any order probably wouldn't make any sense on a hashtable. –  FrustratedWithFormsDesigner Nov 8 '10 at 22:11
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@FrustratedWithFormsDesigner. See Sorted Linear Hash Table –  NealB Nov 9 '10 at 14:57
    
Thanks for the link, that's an interseting idea! I don't think I've ever seen or used an implementation of that (at leat not knowingly). –  FrustratedWithFormsDesigner Nov 9 '10 at 15:02
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In addition to all the other good comments:

Hash tables in general have better cache behavior requiring less memory reads compared to a binary tree. For a hash table you normally only incur a single read before you have access to a reference holding your data. The binary tree, if it is a balanced variant, requires something in the order of k * lg(n) memory reads for some constant k.

On the other hand, if an enemy knows your hash-function the enemy can enforce your hash table to make collisions, greatly hampering its performance. The workaround is to choose the hash-function randomly from a family, but a BST does not have this disadvantage. Also, when the hash table pressure grows too much, you often tend to enlargen and reallocate the hash table which may be an expensive operation. The BST has simpler behavior here and does not tend to suddenly allocate a lot of data and do a rehashing operation.

Trees tend to be the ultimate average data structure. They can act as lists, can easily be split for parallel operation, have fast removal, insertion and lookup on the order of O(lg n). They do nothing particularly well, but they don't have any excessively bad behavior either.

Finally, BSTs are much easier to implement in (pure) functional languages compared to hash-tables and they do not require destructive updates to be implemented (the persistence argument by Pascal above).

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A hashtable would take up more space when it is first created - it will have available slots for the elements that are yet to be inserted (whether or not they are ever inserted), a binary search tree will only be as big as it needs to be. Also, when a hash-table needs more room, expanding to another structure could be time-consuming, but that might depend on the implementation.

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A (balanced) binary search tree also has the advantage that its asymptotic complexity is actually an upper bound, while the "constant" times for hash tables are amortized times: If you have a unsuitable hash function, you could end up degrading to linear time, rather than constant.

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To drive this point home, a degenerate case is when the collection contains many copies of just 1 key. in the BST, insert is O(log n), in a Hash table, insert is O(n) –  IfLoop Nov 9 '10 at 0:07
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A binary search tree can be implemented with a persistent interface, where a new tree is returned but the old tree continues to exist. Implemented carefully, the old and new trees shares most of their nodes. You cannot do this with a standard hash table.

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The main advantages of a binary tree over a hash table is that the binary tree gives you two additional operations you can't do (easily, quickly) with a hash table

  • find the element closest to (not necessarily equal to) some arbitrary key value (or closest above/below)

  • iterate through the contents of the tree in sorted order

The two are connected -- the binary tree keeps its contents in a sorted order, so things that require that sorted order are easy to do.

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A binary tree is slower to search and insert into, but has the very nice feature of the infix traversal which essentially means that you can iterate through the nodes of the tree in a sorted order.

Iterating through the entries of a hash table just doesn't make a lot of sense because they are all scattered in memory.

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One advantage that no one else has pointed out is that binary search tree allows you to do range searches efficiently.

In order to illustrate my idea, I want to make an extreme case. Say you want to get all the elements whose keys are between 0 to 5000. And actually there is only one such element and 10000 other elements whose keys are not in the range. BST can do range search quite efficiently since it will never searches a subtree which is impossible to have the answer.

While, how can you do range search in hash table? You either need to iterate every bucket space, which is O(n), or you have to look for whether each of 1,2,3,4... up to 5000 exists. (what about the keys between 0 and 5000 are an infinite set? for example keys can be decimals)

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BSTs do range searches efficiently! For me this is the best answer it terms of practical and algorithmic approach. –  adam.cajf Dec 11 '13 at 10:51
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If you want to access the data in a sorted manner, then a sorted list has to be maintained in parallel to the hash table. A good example is Dictionary in .Net. (see http://msdn.microsoft.com/en-us/library/3fcwy8h6.aspx).

This has the side-effect of not only slowing inserts, but it consumes a larger amount of memory than a b-tree.

Further, since a b-tree is sorted, it is simple to find ranges of results, or to perform unions or merges.

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main advantage of hash table is that it does almost all ops in ~=O(1). And its very easy to understand and implement. It does solve many "interview problems" efficiently. So if u want to crack a coding interview, make best friends with hash table ;-)

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BSTs also provide the "findPredecessor" and "findSuccessor" operations (To find the next smallest and next largest elements) in O(logn) time, which might also be very handy operations. Hash Table can't provide in that time efficiency.

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It also depends on the use, Hash allows to locate exact match. If you want to query for a range then BST is the choice. Suppose you have a lots of data e1, e2, e3 ..... en.

With hash table you can locate any element in constant time.

If you want to find range values greater than e41 and less than e8, BST can quickly find that.

The key thing is the hash function used to avoid a collision. Of course, we cannot totally avoid a collision, in which case we resort to chaining or other methods. This makes retrieval no longer constant time in worst cases.

Once full, hash table has to increase its bucket size and copy over all the elements again. This is an additional cost not present over BST.

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A hash table is an unordered data structure,When designing a cell phone, you want to keep as much data as possible available for data storage. A hash table is an unordered data structure – which means that it does not keep its elements in any particular order. So, if you use a hash table for a cell phone address book, then you would need additional memory to sort the values because you would definitely need to display the values in alphabetical order – it is an address book after all. So, by using a hash table you have to set aside memory to sort elements that would have otherwise be used as storage space. But binary search tree is a sorted data structure.Because a binary search tree is already sorted, there will be no need to waste memory or processing time sorting records in a cell phone. As we mentioned earlier, doing a lookup or an insert on a binary tree is slower than doing it with a hash table, but a cell phone address book will almost never have more than 5,000 entries. With such a small number of entries, a binary search tree’s O(log(n)) will definitely be fast enough. So, given all that information, a binary search tree is the data structure that you should use in this scenario, since it is a better choice than a hash table.

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