programming-examples/java/Graph_Problems_Algorithms/AStar.java

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2019-11-15 12:59:38 +01:00
package com.jwetherell.algorithms.graph;
import java.util.ArrayList;
import java.util.Collections;
import java.util.Comparator;
import java.util.HashMap;
import java.util.HashSet;
import java.util.List;
import java.util.Map;
import java.util.Set;
import com.jwetherell.algorithms.data_structures.Graph;
import com.jwetherell.algorithms.data_structures.Graph.Edge;
import com.jwetherell.algorithms.data_structures.Graph.Vertex;
/**
* In computer science, A* is a computer algorithm that is widely used in path finding and graph traversal, the process
* of plotting an efficiently traversable path between multiple points, called nodes.
*
* http://en.wikipedia.org/wiki/A*_search_algorithm
*
* @author Justin Wetherell <phishman3579@gmail.com>
*/
public class AStar<T extends Comparable<T>> {
public AStar() { }
/**
* Find the path using the A* algorithm from start vertex to end vertex or NULL if no path exists.
*
* @param graph
* Graph to search.
* @param start
* Start vertex.
* @param goal
* Goal vertex.
*
* @return
* List of Edges to get from start to end or NULL if no path exists.
*/
public List<Graph.Edge<T>> aStar(Graph<T> graph, Graph.Vertex<T> start, Graph.Vertex<T> goal) {
final int size = graph.getVertices().size(); // used to size data structures appropriately
final Set<Graph.Vertex<T>> closedSet = new HashSet<Graph.Vertex<T>>(size); // The set of nodes already evaluated.
final List<Graph.Vertex<T>> openSet = new ArrayList<Graph.Vertex<T>>(size); // The set of tentative nodes to be evaluated, initially containing the start node
openSet.add(start);
final Map<Graph.Vertex<T>,Graph.Vertex<T>> cameFrom = new HashMap<Graph.Vertex<T>,Graph.Vertex<T>>(size); // The map of navigated nodes.
final Map<Graph.Vertex<T>,Integer> gScore = new HashMap<Graph.Vertex<T>,Integer>(); // Cost from start along best known path.
gScore.put(start, 0);
// Estimated total cost from start to goal through y.
final Map<Graph.Vertex<T>,Integer> fScore = new HashMap<Graph.Vertex<T>,Integer>();
for (Graph.Vertex<T> v : graph.getVertices())
fScore.put(v, Integer.MAX_VALUE);
fScore.put(start, heuristicCostEstimate(start,goal));
final Comparator<Graph.Vertex<T>> comparator = new Comparator<Graph.Vertex<T>>() {
/**
* {@inheritDoc}
*/
@Override
public int compare(Vertex<T> o1, Vertex<T> o2) {
if (fScore.get(o1) < fScore.get(o2))
return -1;
if (fScore.get(o2) < fScore.get(o1))
return 1;
return 0;
}
};
while (!openSet.isEmpty()) {
final Graph.Vertex<T> current = openSet.get(0);
if (current.equals(goal))
return reconstructPath(cameFrom, goal);
openSet.remove(0);
closedSet.add(current);
for (Graph.Edge<T> edge : current.getEdges()) {
final Graph.Vertex<T> neighbor = edge.getToVertex();
if (closedSet.contains(neighbor))
continue; // Ignore the neighbor which is already evaluated.
final int tenativeGScore = gScore.get(current) + distanceBetween(current,neighbor); // length of this path.
if (!openSet.contains(neighbor))
openSet.add(neighbor); // Discover a new node
else if (tenativeGScore >= gScore.get(neighbor))
continue;
// This path is the best until now. Record it!
cameFrom.put(neighbor, current);
gScore.put(neighbor, tenativeGScore);
final int estimatedFScore = gScore.get(neighbor) + heuristicCostEstimate(neighbor, goal);
fScore.put(neighbor, estimatedFScore);
// fScore has changed, re-sort the list
Collections.sort(openSet,comparator);
}
}
return null;
}
/**
* Default distance is the edge cost. If there is no edge between the start and next then
* it returns Integer.MAX_VALUE;
*/
protected int distanceBetween(Graph.Vertex<T> start, Graph.Vertex<T> next) {
for (Edge<T> e : start.getEdges()) {
if (e.getToVertex().equals(next))
return e.getCost();
}
return Integer.MAX_VALUE;
}
/**
* Default heuristic: cost to each vertex is 1.
*/
protected int heuristicCostEstimate(Graph.Vertex<T> start, Graph.Vertex<T> goal) {
return 1;
}
private List<Graph.Edge<T>> reconstructPath(Map<Graph.Vertex<T>,Graph.Vertex<T>> cameFrom, Graph.Vertex<T> current) {
final List<Graph.Edge<T>> totalPath = new ArrayList<Graph.Edge<T>>();
while (current != null) {
final Graph.Vertex<T> previous = current;
current = cameFrom.get(current);
if (current != null) {
final Graph.Edge<T> edge = current.getEdge(previous);
totalPath.add(edge);
}
}
Collections.reverse(totalPath);
return totalPath;
}
}