I don't understand how the following graph gives a suboptimal solution with A* search.

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The graph above was given as an example where A* search gives a suboptimal solution, i.e the heuristic is admissible but not consistent. Each node has a heuristic value corresponding to it and the weight of traversing a node is given. I don't understand how A* search will expand the nodes.

  • Only A* with "graph search" will return a suboptimal solution. See stackoverflow.com/questions/10680180/…. – ziggystar Sep 13 '14 at 14:39
  • Imho the pseudoimplementation of the "A* graph" is a really bad one but it can be the only reason for a subopt solution. – Demplo Sep 13 '14 at 14:56

The heuristic h(n) is not consistent.

Let me first define when a heuristic function is said to be consistent.

h(n) is consistent if  
– for every node n
– for every successor n' due to legal action a 
– h(n) <= c(n,a,n') + h(n')

Here clearly 'A' is a successor to node 'B' but h(B) > h(A) + c(A,a,B)

Therefore the heuristic function is not consistent/monotone, and so A* need not give an optimal solution.


Honestly I don't see how A* could return a sub-optimal solution with the given heuristic. This is for a simple reason: the given heuristic is admissible (and even monotone/consistent).

h(s) <= h*(s) for each s in the graph

You can check this yourself comparing the h value in each node to the cost of shortest path to g.

Given the optimality property of A* I don't see how it could return a sub-optimal solution, which should be S -> A -> G of course.

The only way it could return a suboptimal solution is if it would stop once an action from a node in the frontier leading to the goal is found (so to have a path to the goal), but this would not be A*.

  • The heuristic is not monotone. It decreases from B to A. – ziggystar Sep 13 '14 at 15:14
  • True, not only there. Still is admissible and should guarantee optimality. – Demplo Sep 13 '14 at 15:33
  • Sorry, I'm a bit confused today. :) – ziggystar Sep 13 '14 at 16:02
  • Your comment was actually relevant. The heuristic is not consistent. – Demplo Sep 13 '14 at 16:26
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    @Crackej If the heuristic is not monotone, then you need to reopen nodes, as you can later encounter them on a cheaper path. – ziggystar Sep 13 '14 at 18:50

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