(I'm assuming your goal is to find *all* pairs in L that sum to something in M)

Forget hashtables!

Sort both lists.

Then do the outer loop of your algorithm: walk over every element i in L, then every larger element j in L. As you go, form the sum and check to see if it's in M.

But don't look using a binary search: simply do a linear scan from the last place you looked. Let's say you're working on some value i, and you have some value j, followed by some value j'. When searching for (i+j), you would have got to the point in M where that value is found, or the first largest value. You're now looking for (i+j'); since j' > j, you know that (i+j') > (i+j), and so it cannot be any earlier in M than the last place you got. If L and M are both smoothly distributed, there is an excellent chance that the point in M where you would find (i+j') is only a little way off.

If the arrays are not smoothly distributed, then better than a linear scan might be some sort of jumping scan - look forward N elements at a time, halving N if the jump goes too far.

I believe this algorithm is O(n^2), which is as fast as any proposed hash algorithm (which have an O(1) primitive operation, but still have to do O(n**2) of them. It also means that you don't have to worry about the O(n log n) to sort. It has much better data locality than the hash algorithms - it basically consists of paired streamed reads over the arrays, repeated n times.

EDIT: I have written implementations of Paul Baker's original algorithm, Nick Larsen's hashtable algorithm, and my algorithm, and a simple benchmarking framework. The implementations are simple (linear probing in the hashtable, no skipping in my linear search), and i had to make guesses at various sizing parameters. See http://urchin.earth.li/~twic/Code/SumTest/ for the code. I welcome corrections or suggestions, about any of the implementations, the framework, and the parameters.

For L and M containing 3438 items each, with values ranging from 1 to 34380, and with Larsen's hashtable having a load factor of 0.75, the median times for a run are:

- Baker (binary search): 423 716 646 ns
- Larsen (hashtable): 733 479 121 ns
- Anderson (linear search): 62 077 597 ns

The difference is much bigger than i had expected (and, i admit, not in the direction i had expected). I suspect i have made one or more major mistakes in the implementation. If anyone spots one, i really would like to hear about it!

One thing is that i have allocated Larsen's hashtable inside the timed method. It is thus paying the cost of allocation and (some) garbage collection. I think this is fair, because it's a temporary structure only needed by the algorithm. If you think it's something that could be reused, it would be simple enough to move it into an instance field and allocate it only once (and Arrays.fill it with zero inside the timed method), and see how that affects performance.