In the latest IEEE Xtreme Competition, a problem I've tried to solve is this,

Input Two points p1(x1,y1) , p2(x2,y2) you must find the length of shortest path from p1 to p2,

for example if p1(1,1) , p2(4,4) then the shortest path has lenght of 9 edges,

I did something like depth first search, it works great if the distance between the two point is small, and take long time for example for the points (1,1) & (10,10),

**And there is a limit on the points the maximum point is (12,12).**

my approach is to convert the above picture to an undirected graph with all weights to 1, and then find the shortest path.

here are my function that finds the shortest path:

```
int minCost;
vector<int> path;
multimap<int,int> Connections;
typedef multimap<int,int>::iterator mmit;
void shortestPath(int cs){
if(cs > minCost)
return;
if(path.back() == Target){
if(cs < minCost)
minCost = cs;
return;
}
pair<mmit,mmit> it = Connections.equal_range(path.back());
mmit mit = it.first;
for( ; mit != it.second ; ++mit){
if(isVisited(mit->second))
continue;
markVisited(mit->second);
path.push_back(mit->second);
shortestPath(cs+1);
markUnvisited(mit->second);
path.pop_back();
}
}
```

Is there any way faster than this ?? could i use dijkstra for this undirected graph ??