Most efficient way to build a polygon from an unordered list of edges

Here is my little programming challenge of the day:

I have a list of edges that we know for sure should join end-to-end to form a unique polygon. The edges are not ordered, and the nodes at the ends of the edges are not ordered. The number of edges is a variable (>3, obviously).

What is the fastest way to build the polygon in C++?

Example: given five edges: (A,P) (C,D) (A,E) (C,P) (E,D) devise a code to efficiently output the list of nodes APCDE in this order. The code should work for any number of unordered edges. Note that we do not care about the coordinates of the nodes A,P,C,D,E. We can therefore say nothing about the convexity, the degenerate nature, or the direction of the polygon.

Thanks, smart folks.

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algorithm that every one can think of should be of n square complexity, idk if there is any better algo. –  Krypton Oct 18 '13 at 5:15
What have you tried? Please follow question posting guidelines. –  hawk Oct 18 '13 at 10:14