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Given 3 points in a grid, how would you find a point such that sum of distances of this point from all 3 points in minimized. An obvious answer to this problem is Fermat's triangle. I am interested in knowing if we can locate Fermat's point using a breadth first search algorithm in a graph.

struct node{
  int Person1X,Person1Y,Person2X,Person2Y,Person3X,Person3Y; //X and Y coordinates of all 3 persons
  int steps;   //sum of distances covered by all 3 person to reach this state
}

While doing the BFS we could put a constraint, if steps>min(sum of any two edges of the triangle with 3 persons as vertices) return;

if(Person1X=Person2X=Person2X)AND(Person1Y=Person2Y=Person3Y) return steps;
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What distance metric is used? If Euclidean, see methods in wikipedia's Fermat point article. If Manhattan, 3/4 of all triangles have no such point. –  jwpat7 Oct 23 '12 at 6:52
    
It's Manhattan. Why would 3/4 of all the triangles have no such point? –  Anirvana Oct 23 '12 at 13:46
    
I misspoke, due to thinking of a different problem. Of course for each triangle ABC on a grid there's a grid point F such that AF+BF+CF is minimal in Manhattan distances. But for 3/4 of all triangles there is no point F where AF=BF=CF in Manhattan distances: Let pqr denote the parities of points ABC. (Point (x,y)'s parity is (x+y)%2.) pqr is in {000,001,010,011,100,101,110,111} and takes each value with equal probability. A point that is distance d from an even-parity point cannot be distance d from an odd-parity point. –  jwpat7 Oct 23 '12 at 15:59
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1 Answer 1

up vote 1 down vote accepted

No search is necessary.

Given "triangle" ABC: SumOfDistances( p ) = dist( A, p ) + dist( B, p ) + dist( C, p )

where dist( q, p ) = |qx-px| + |qy-py|

you can see that SumOfDistances( p ) = SumOfDistancesx( p ) + SumOfDistancesy( p )

So, you can minimize by the distance on the x and y axis independently.

So, the Fermat point's x-coordinate is the median of the 3 given x-coordinates. The Fermat point's y-coordinate is the median of the 3 given y-coordinates.

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To see why this is correct intuitively, think about what happens to the total distance when you take 1 step away from the Fermat point. –  Tom Sirgedas Oct 25 '12 at 0:04
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