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I am trying to understand how is iterating through a hashtable implemented. I just cannot imagine it. I am particularly interested in the speed of such iteration. For example:

QHash<int, std::string> hashTable;
...
for (auto it = hashTable.begin(); it != hashTable.end(); ++it)
    std::cout << it.value() << std::endl;

Is this an O(hashTable.size()) operation?

I tried to dig in the source code, but could not find the proper definition.

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1 Answer 1

up vote 7 down vote accepted

Some implementations of hash tables also maintain a linked list of all entries to allow fast iteration (a so-called "linked hash-map").

When they don't, the only way is to iterate over all buckets of the hash table, while also iterating over the elements in each bucket.

The speed of this operation depends on the fill state of the table. When it's very low, a lot of empty buckets need to be iterated, which wastes time. When the table is filled well, and one or more elements are in each bucket, it's almost like iterating a linked list. On a perfect hash map where each bucket contains exactly one element, it's like iterating an array.

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Thank you! So the operation is always in linear time, right? –  Martin Drozdik Jan 8 '13 at 10:58
1  
Yes, linear to the number of buckets + linear to the number of entries. –  Philipp Jan 8 '13 at 11:41
1  
Your for loop is equivalent to the STL algorithm std::for_each. That algorithm is linear in the number of elements being visited. Furthermore, the std::unordered_map container has at least a forward iterator, and all operations on such iterators are at most amortized constant. This means that a loop over an entire hash table also has linear time complexity (and not just linear size complexity). –  TemplateRex Jan 8 '13 at 11:46
1  
That requirement on iterators is IMO unfortunate. It means that technically if you write an "successive powers iterator" that returns some BigNum type, doubled each time you increment the iterator, and pass it to a standard algorithm, then you have undefined behavior. Not just slower-than-expected, UB. If the complexity guarantees of the algorithms were expressed in terms of the number of iterator ops as well as the number of predicate ops/copies/whatever, then behavior could be defined. But they aren't, they require amortized constant iterator ops. –  Steve Jessop Jan 8 '13 at 13:02

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