Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

Given D discs, P poles, and the initial starting positions for the disks, and the required final destination for the poles, how can we write a generic solution to the problem?

For example,

Given D=6 and P=4, and the initial starting position looks like this:

5     1
6 2 4 3

Where the number represents the disk's radius, the poles are numbered 1-4 left-right, and we want to stack all the disks on pole 1.

How do we choose the next move?

The solution is (worked out by hand):

3 1
4 3
4 1
2 1
3 1

(format: <from-pole> <to-pole>)

The first move is obvious, move the "4" on top of the "5" because that its required position in the final solution.

Next, we probably want to move the next largest number, which would be the "3". But first we have to unbury it, which means we should move the "1" next. But how do we decide where to place it?

That's as far as I've gotten. I could write a recursive algorithm that tries all possible places, but I'm not sure if that's optimal.

share|improve this question

1 Answer 1

up vote 2 down vote accepted

We can't.

More precisely, as http://en.wikipedia.org/wiki/Tower_of_Hanoi#Four_pegs_and_beyond says, for 4+ pegs, proving what the optimal solution is is an open problem. There is a known very good algorithm, that is widely believed to be optimal, for the simple case where the pile of disks is on one peg and you want to transfer the whole pile to another. However we do not have an algorithm, or even a known heuristic, for an arbitrary starting position.

If we did have a proposed algorithm, then the open problem would presumably be much easier.

share|improve this answer
    
It's not exactly that we can't... It's more that we don't have a efficient algorithm for it. For a reasonable number of poles/discs, a breadth-first search algorithm will work. –  Nicolas Jul 3 '12 at 5:58
    
Took me 5 or 6 hours to come up with a solution, and it only works for a small number of disks and pegs. Wish I knew this before going into the problem :) Thanks for your help! –  user1497789 Jul 4 '12 at 3:51

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.