The best thing to do with questions like this is try to establish some small results that will help you with the overall problem.
For example, it is not too hard to determine that for any three points, A, B and C, which have the condition that B is between (more on this in a second) A and C, B will never be further from a fourth point D than one of A and C. With the standard Euclidean metric of distance, a point is between two other points if it lies on the segment joining them. For Manhattan measurements it is not so simple - partly because the concept of a segment is not as well understood.
A more general way of describing 'between' is this (using the notation that the distance from A to B is |AB|):
A point B is between two points A, C if |AB| + |BC| = |AC|
You can see that in Euclidean distance this means that B lies on the segment joining A and C.
In Manhattan distance, this means that the point B is contained in the rectangle defined by A and C (which of course could be a straight segment if AC is parallel one of the axis).
This result means that for any point, if it lies between two existing points, it can be no further from any new points that are added to the set than the two which surround it.
Now, this information does not solve the issue for you, but it does let you throw away many potential future calculations. Once you have determined that a point is between two others, there is no point in tracking it.
So, you can solve this problem by only tracking the outermost points, and disregarding any that fall within.
An interesting exercise for the casual observer
Prove that you can have no more than 4 distinct points such that none of the points are between two of the others, in the Manhattan sense.
With this second result it becomes clear that you will only ever need to track up to 4 points.
Some of the other methods already presented are probably faster, but this way is more fun!
Generalise these ideas to n dimensions