Define an item as having:

- a unique id
- a value
- a creation time
- a deletion time

I have two input streams - one that informs me when an item is created, one that informs me when the item is deleted. Call an item that has been created but not destroyed "living."

I can track the maximum value of all living items using a heap:

```
whenCreated(item):
i = heap.size
heap-up(item, heap.size)
heap.size = heap.size + 1
max-value = heap[0]
whenDeleted(item):
ktem = heap[heap.size - 1]
heap.size = heap.size - 1
heap-up(ktem, index[item.id])
heap-down(ktem, index[ktem.id])
max-value = heap[0]
heap-up(item, i):
while (i > 0):
j = floor( (i-1) / 2 )
jtem = heap[j]
if (jtem.value > item.value):
break while
index[jtem.id] = i
heap[i] = heap[i]
i = j
index[item.id] = i
heap[i] = item
heap-down(item, i):
while (2*i + 1 < heap.size):
if (2*i + 1 == heap.size or heap[2*i+1].value > heap[2*i+2].value):
j = 2*i + 1
else
j = 2*i + 2
jtem = heap[j]
if (jtem.value < item.value):
break while
index[jtem.id] = i
heap[i] = heap[i]
i = j
index[item.id] = i
heap[i] = item
```

If I've got `n`

items, then adding or deleting one takes `O(log n)`

time.

Now suppose the items are clustered such that given two items, `a`

and `b`

, `|a.value - b.value| < delta`

⇒ `a`

and `b`

are in the same cluster.

For example, if we've got the values `(1, 2, 3, 4, 7, 8, 11, 13, 14, 15, 16)`

and `delta = 2`

, then the clusters are `(1, 2, 3, 4)`

, `(7, 8)`

, `(11)`

, and `(13, 14, 15, 16)`

.

I'd like to track the minimum value of the cluster that contains the maximum living value. I can do this by reading values off the heap in order until I find a gap between values of size greater than equal to `delta`

. However, this takes `O(n)`

time, which seems rather inefficent.

Is there an `O(log n)`

algorithm to track the minimum value of that cluster?

`O(n)`

solution is worthwhile. Meaning if it will be rare that the end of the cluster changes often then it's not the end of the world. You can improve it slightly by moving to a BST and maintaining a single pointer, and then your`O(n)`

work doesn't happen on delete, only on inserts and even then, if you expect small clusters relative to`n`

it shouldn't be noticeable. – davin Feb 3 '12 at 19:45