Given a set of points in 2D plane, How to find number of points lying on or inside any arbitrary triangle.
One method is to check all points whether they lie inside the given triangle.
But I read that Kdtree can be used to find the number of points lying within a region in O(log n) time, where 'n' is number of points. But I did not understand how to implement that.
Is there any other simpler method to do that?
Or kdtree will work? If so can someone explain how?



It can be done by recursively checking position of subpartitions to a triangle. To see which points of a tree node are in a triangle, check each of a node partition (there are 2 in a kd tree) is it whole in a triangle, is it outside of a triangle or is it intersecting triangle. If partition is in triangle than add number of points in that partition to a result, if partition is out of triangle than do nothing for that partition, if partition intersects triangle than make same check for a subpartitions of that partition. For this, each tree node has to store number of points in its subtree, which is easy to do in tree creation. Running time depends on a number of intersections of triangle edges with a partition boundaries. I'm not sure is it 

