I was recently asked this question in an interview. Even though I was able to come up the O(n^2) solution, the interviewer was obsessed with an O(n) solution. I also checked few other solutions of O(nlog n) which I understood, but O(n) solution is still not my cup of tea which assumes appointments sorted by start-time.

Can anyone explain this?

Problem Statement:

You are given 'n' appointments. Each appointment contains a start time and an end time. You have to retun all conflicting appointments efficiently.

Person: 1,2,3,4,5 App St: 2,4,29,10,22 App End: 5,7,34,11,36

Answer: 2x1 5x3

O(nlog n) algorithm: separate start and end point like this:

2s,4s,29s,10s,22s,5e,7e,34e,11e,36e

then sort all of this points (for simplicity lets assume each point is unique):

2s,4s,5e,7e,10s,11e,22s,29s,34e,36e

it we have consecutive starts without ends then it is overlapping : 2s,4s are adjacent so overlapping is there

We will keep a count of "s" and each time we encounter it will +1, and when e is encountered we decrease count by 1.

`O(n)`

in principle, because theoutputis not of size`O(n)`

. If all`n`

appointments conflict then the output has size proportional to`n^2`

. [Edit: actually I've made an assumption there about the output format that may not be warranted -- that it's a list of all pairs of conflicting appointments]. – Steve Jessop Sep 5 '12 at 14:27anycollision?) Can it be be done in`O(n)`

? Or is`O(nlogn)`

optimal (assuming unsorted data) – amit Sep 5 '12 at 14:37