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How can I go about proving that an undirected graph having even no. of nodes (at least one of the rows or columns are even - excluding line graphs of course) have a hamiltonian cycle?

I have managed to come as far as to prove that it is a bipartite graph and (as a result ) has all cycles of even length.

But exactly how can I show that at least one such cycle exists that covers all the available nodes?

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Can't you just snake back and forth across the rows to get a Hamiltonian path? – templatetypedef Nov 8 '13 at 5:17
    
@templatetypedef : Yes I can do that. But I want a general proof for ANY grid. – Zshn Nov 8 '13 at 6:37

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