# Solving N queens puzzle using pthreads

I know how to solve n queens puzzle, using backtracking and recursion.

I was thinking how can I optimise this using multi-threading.

I am trying with p - threads.

Basically I am not able to understand where top apply threading, and where to join the threads.

As this is recursion, I am also,not able to understand how threading will work here.

--

Thanks

Alok Kr.

-
I am reading the books as well, but was in a hurry to find the way. Also I am not able to get how multi-threading will work with backtracking and recursion, and will it really optimise? –  Kumar Alok Jun 30 '12 at 3:24
It may. Or may slow down things a big time. It depends on many things including how you actually write it. Anyhow, take a look at this paper from Intel that solves your problem in parallel - software.intel.com/en-us/articles/… –  user405725 Jun 30 '12 at 3:30
Actually the definitive answer is no it won't optimise, since it's an irregular problem, doing it recursively and synchronizing on the backtrack will cause a load imbalance. Hence it's a good example for the Cilk solution shown in the reference above which will balance the load through workstealing. (This is precisely why Cilk benchmarks have always included this problem) –  Jon E Jul 3 '12 at 3:19

One way is using a queue to put each expansion into a queue instead of doing recursion. Have a pool of threads that pop an expansion and work on it:

``````create a state with an empty board and put it into the queue
create N threads with the following function
``````

``````while not done:
1) pop a state S from the queue (use locks), if queue is empty,
wait on a semaphore until there is an S
2) expand state S
2a) if S has feasible children then put them into the queue
except for one state SS, call it S and goto 2
(also signal the semaphore)
2b) if S has no feasible children goto 1
end while
``````

You can modify this for different algorithms

-
With pthreads you would probably use a condition variable rather than a semaphore to wait in step 1. –  caf Jul 2 '12 at 7:16