Stack Overflow is a community of 4.7 million programmers, just like you, helping each other.

Join them; it only takes a minute:

Sign up
Join the Stack Overflow community to:
  1. Ask programming questions
  2. Answer and help your peers
  3. Get recognized for your expertise

I am trying to implement the A star algorithm in Javascript. But the problem I am facing is in the heuristic_cost_estimate function. I don't know how to implement this. As in where is the definition of this function. I don't want the whole code, just the function.

 function A*(start,goal)
         closedset := the empty set    // The set of nodes already evaluated.
         openset := {start}    // The set of tentative nodes to be evaluated, initially containing the start node
         came_from := the empty map    // The map of navigated nodes.

         g_score[start] := 0    // Cost from start along best known path.
         // Estimated total cost from start to goal through y.
    *************************************************** heurisctic function******************  

   f_score[start] := g_score[start] + ***heuristic_cost_estimate(start, goal)***

         while openset is not empty
             current := the node in openset having the lowest f_score[] value
             if current = goal
                 return reconstruct_path(came_from, goal)

             remove current from openset
             add current to closedset
             for each neighbor in neighbor_nodes(current)
                 if neighbor in closedset
                 tentative_g_score := g_score[current] + dist_between(current,neighbor)

                 if neighbor not in openset or tentative_g_score < g_score[neighbor] 
                     add neighbor to openset
                     came_from[neighbor] := current
                     g_score[neighbor] := tentative_g_score
                     f_score[neighbor] := g_score[neighbor] + heuristic_cost_estimate(neighbor, goal)

         return failure

     function reconstruct_path(came_from, current_node)
         if came_from[current_node] is set
             p := reconstruct_path(came_from, came_from[current_node])
             return (p + current_node)
             return current_node
share|improve this question
Are you asking us to translate this pseudo-code into javascript?? – Jonathan M Jun 29 '12 at 18:12
no no... not at all.. i am doing it myself... i am asking about the heuristic function.... how can i define it ? i dont see its defintion in the algo. though i know its usage. but in the programe its confusing me – V.V.S Laxman Jun 29 '12 at 18:14

This post provides a pretty good explanation on appropriate heuristic functions, in the context of an A* search.

From what I understand, it should provide a fast way to estimate the cost (whatever you define the cost to be) from the start to the end node while going through the node you are currently considering. It's used to help determine the optimal path you should take to reach the end node.

Here's some more information on heuristic functions.

share|improve this answer
thank you.. i am trying to solve the problem through djkshtras though – V.V.S Laxman Jun 29 '12 at 18:30

That function isn't pre-defined because it changes, based on what you're using A* to do. The heuristic must be appropriate for the problem you're actually trying to solve, and it must follow certain rules (the answer Zhihao links to seems to spell them all out).

So basically: you have to decide what is a meaningful heuristic to use for your actual problem, and then implement that in a function. There isn't just one.

Notice that the "better" your heuristic approaches the true cost, the faster your search will be.

share|improve this answer
yes actully in the problem i will be given a graph with nodes and distance between the nodes representing the edge. and then i have to calculate the shortest path. isnt dijkstra's better in this case. i am making the code.. ill post it as sonn as i complete it – V.V.S Laxman Jun 29 '12 at 18:36
Djikstra's algorithm is the exact same as an A* implementation where the heuristic always returns zero. – Paul Phillips Jun 29 '12 at 18:37

Your Answer


By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.