In "Introduction to algorithms, 3rd edition" exercise 24.3-5 wants an example that this is wrong (not always true). Is that possible? In my mind this is impossible because every edge is relaxed at a time when the path to the current vertice is already decided.
Word for word:
Professor N. claims to have a proof of correctness of Dijkstra's algorithm. He claims that Dijkstra's algorithm relaxes the edges of every shortest path in the graph in the order in which they appear on the path, and therefore the path-relaxation property applies to every vertex reachable from the source. Show the professor is mistaken by constructing a directed graph for which Dijkstra's algorithm could relax the edges of a shortest path out of order.