Given a set of points
p, I would like to find a point within the space
b that bounds the region of
p that is as far distant as possible from all points within
This is in regards to implementing neighbor avoidance in a flocking simulation as per Craig Reynolds' Boids - if this isn't the best way to avoid neighbors I would love suggestions.
In other words, I'd like to find an arbitrary point that is as far from the other points in
p as possible, while remaining within the bounding box around
By bounding box I mean the solution should be a point that has a y-coordinate that is between the upper and lowermost points, and an x coordinate that is between the left and rightmost points.
To put the question more abstractly, I am looking at this algorithm as a way to find a target for an agent that wants to stay within
M units of its nearest neighbors while not getting closer than
m units of them. The solution returned by this algorithm should return a point that has the largest distance between it and its closest neighbor.
This is in a 2D plane.