I had this as the final question on an algorithms final (now completed):

Given a set of (x,y) points **P**, let **M(P)** be the set of **maximal points** given the following partial ordering on P:

```
(x,y) < (x',y') if and only if x < x' and y < y'.
```

Thus:

```
M({(0,0),(1,1)})={(1,1)}
M({(0,0),(0,1),(1,0)})={(0,1),(1,0)}
```

Give algorithms that compute M(P) with time complexity O(nh), O(n log n), and O(n log h) (where n = |P| and h=|M(P)|)

My O(nh) algorithm:

```
Declare M as a set of points
foreach p in P:
addP = true
foreach m in M:
if(p < m):
addP = false
break
if(m < p):
M.remove(m)
if(addP)
M.add(p) //doesn't add if M contains p
return M
```

My O(n log n) algorithm:

```
Declare M as a set of points
Sort P in reverse lexicographic order
maxY := -inf
foreach p in P:
if(p.y > maxY):
M.add(p)
maxY = p.y
return M
```

**What is an O(n log h) algorithm?**

My intuition is that it is a modification of the first algorithm, but using some clever data structure (perhaps a modification of a binary tree) that doesn't need to be scanned through for each point.

**Is there such an algorithm for a general poset?**

This would find the leaves of any directed tree given a list of vertices and constant time lookup of whether there is a directed path between two given vertices.

`p`

. If there is no such point - end the algorithm. else: add`p`

to the maximal set, and repeat. – amit Dec 14 '11 at 7:50