It is well known that computing a spanning tree that has the minimum possible number of leaves is NP complete. But I cannot figure out a polynomial time reduction of this problem to the hamiltonian path problem.
My exponential reduction:
if(hamiltonian path exists for whole graph) min leaves = 1; return; else for each vertex of the graph if(hamiltonian path exists for this graph after removing the vertex and its incident edges) min leaves = 2; return; continue similarly for the graph deleting 2 vertices, 3 vertices, 4vertices,... until you get a minimum spanning tree with some minimum number of leaves.
So, in the worst case, this algorithm will make a total of
(N choose 1) + (N choose 2) + (N choose 3) + ....(N choose N) = 2^N
calls to the hamiltonian path problem . Hence reduction is exponential.
Please suggest a polynomial time reduction for this problem.