I’ve implemented and used A* several times and thought I knew everything there was to know about A*…. Until I encountered this example:

The graph consists of 4 nodes and 6 directed weighted edges. The heuristic is denoted per node by `H=…`

. The heuristic is clearly admissible, so I don't see any problems with that.

The problem is to find the route from *start* to *goal* with the minimal total cost. The correct solution is the route taking the edges with the costs 36 and 18.

My implementation of A* performs the following steps(omitting any operations related to the closed list):

- The startnode is {G = 0, H = 200, -> F = 200} and is selected as ‘current node’
- All its neighbours are added to the openlist
`= {{G=5, H=100, F=105}, {G=36, H=100, F=136}}`

. - The new ‘current node’ is selected, which is the node in the open list with smallest F, which is the node with
`F = 105`

, the upper node in the image. - The neighbours of that node are added to the openlist, which then has the elements { {G=36, H=100,F=136}, {G=58,H=0,F=58}}.
- Again a new current node is selected, which is the goal node, so the algorithm terminates and the route with the costs 5 and 53 is selected.

So the implementation produces the wrong result. What in these steps shouldn’t have happened?