Given a weighted undirected graph **G** and two vertices **a, b**, we want to find two paths **a -> b** and **b -> a** such that they don't share any edge, and such that the sum of weights of edges in both paths is minimum. There can be up to **1,000** vertices, and up to **10,000** edges.

I had initially tried to come up with a dynamic programming approach, but couldn't find such. Any ideas/suggestions would be extremely appreciated.

tryingto say doesn't work due to Evgeny's counter-example below(though I don't understand where dynamic programming comes into it...)– BlueRaja - Danny Pflughoeft Aug 9 '12 at 15:50