Is there any way to implement hash tables efficiently in a purely functional language? It seems like any change to the hash table would require creating a copy of the original hash table. I must be missing something. Hash tables are pretty darn important data structures, and a programming language would be limited without them.
Hash tables are a concrete implementation of the abstract "dictionary" or "associative array" data structure. So I think you really want to ask about the efficiency of purely functional dictionaries compared to imperative hash tables.
Yes, hash tables are inherently imperative and there is no direct purely functional equivalent. Perhaps the most similar purely functional dictionary type is the hash trie but they are significantly slower than hash tables due to allocations and indirections.
Dictionaries are a very important data structure (although its worth noting that they were rare in the mainstream until Perl made them popular in the 1990s, so people coded stuff for decades without benefit of dictionaries). I agree that hash tables are also important because they are often by far the most efficient dictionaries.
There are many purely functional dictionaries:
But these purely functional dictionaries are all much slower than a decent hash table (e.g. the .NET
Beware Haskell benchmarks comparing hash tables to purely functional dictionaries claiming that purely functional dictionaries are competitively performant. The correct conclusion is that Haskell's hash tables are so inefficient that they are almost as slow as purely functional dictionaries. If you compare with .NET, for example, you find that a .NET
EDIT Scott West (aka Saynte) has downvoted my answer and added a comment with exactly the kind of misinformation I was referring to. Pay no attention to Haskell's hash tables in this context, just look at the performance of the fastest hash tables (i.e. not Haskell) and the fastest purely functional dictionaries.
The existing answers all have good points to share, and I thought I would just add one more piece of data to the equation: comparing performance of a few different associative data structures.
The test consists of sequentially inserting then looking up and adding the elements of the array. This test isn't incredibly rigorous, and it shouldn't be taken as such, it just an indication of what to expect.
First in Java using
Then a Haskell implementation using the recent hashtable work done by Gregory Collins (its in the
Lastly, one using the immutable
Examining the performance for n=10,000,000 , I find the total running time is the following:
Knocking it down to n=1,000,000, we get:
This is interesting for two reasons:
This would seem to indicate that in languages like Haskell and Java which have boxed the map's keys see a big hit from this boxing. Languages that either do not need, or can unbox the keys and values would likely see couple times more performance.
Clearly these implementations are not the fastest, but I would say that using Java as a baseline, they are at least acceptable/usable for many purposes (though perhaps someone more familiar with Java wisdom could say whether HashMap is considered reasonable).
I would note that the Haskell HashMap takes up a lot of space compared to the HashTable.
The Haskell programs were compiled with GHC 7.0.3 and
Hash tables can be implemented with something like the ST monad in Haskell, which basically wraps IO actions in a purely functional interface. It does so by forcing the IO actions to be performed sequentially, so it maintains referential transparency: you can't access the old "version" of the hash-table.