is there a way to Join 2 tables in linear time? I heard this can be done by having another data structure (Hashtable), but I'm not sure how this can be done. I was always wondering a Join will involve a crossproduct and hence it is O(n^2).

Algorithm: Loop through table A. Hash all Items, Add them to the Join array. 


If there are indexes available on columns used in the join, it's linear because the indexes allow an inorder traversal of both tables. (That's not counting the amortized index cost, of course.) A hash join will be sortof linear, though the hashing itself isn't free, and when the keys involved are long then the costs also go up. 


It depends on the type of join. A cross join is always going to be O(n^2) since it has to produce O(n^2) records. An equijoin can be done with better complexity (O(n log(n)) or perhaps even amortized O(n)), provided right data structures are employed. 


You can join two tables in close to O(n) by using a hash table to look up records in one table based on the id of the other table. Well, actually the operation will be close to O(n+m), where n and m are the number of items in the two tables. You would first loop through the records in one table to build a hash table from the key in that table, then you would loop through the other table to look up a match in the hash table for each of the records. Looking up an item in a hash table is not an O(1) operation, but it's close. With more data you will have a few more hash collisions, so some of the lookups need to do more than one comparison. 


Major db vendors deprecated hash indexes longlong time ago. Therefore, joining 2 tables in O(max(n,m)) time is something that really doesn't matter in practice. With standard Btree indexes join complexity is O(min(n,m)*log(max(n,m)). 

