What is dynamic programming algorithm for finding a Hamiltonian cycle in a undirected graph? I have seen somewhere that there exists a algorithm with O(n*2^n) time complextity
There is indeed an O(n2n) dynamic-programming algorithm for finding Hamiltonian cycles. The idea, which is a general one that can reduce many O(n!) backtracking approaches to O(n22n) or O(n2n) (at the cost of using more memory), is to consider subproblems that are sets with specified "endpoints".
Here, since you want a cycle, you can start at any vertex. So fix one, call it
As with most dynamic programming problems, once you define the subproblems the rest is obvious: Loop over all the 2n sets S of vertices in any "increasing" order, and for each v in each such S, you can compute
Finally, there is a Hamiltonian cycle iff there is a vertex
If you want the actual Hamiltonian cycle instead of just deciding whether one exists or not, make
I can't pluck out that particular algorithm, but there is more about Hamiltonian Cycles on The Hamiltonian Page than you will likely ever need. :)