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# Python: Algorithm [closed]

Question: Given a list of unordered timestamps, find the largest span of time that overlaps
For example: [1,3],[10,15],[2,7],[11,13],[12,16],[5,8] => [1,8] and [10,16]

I was asked to solve the above question.

My initial approach was the following:

``````times = [[1,3],[10,15],[2,7],[11,13],[12,16],[5,8]]
import itertools
def flatten(listOfLists):
return itertools.chain.from_iterable(listOfLists)
start = [i[0] for i in times]
end = [i[1] for i in times]
times = sorted(list(flatten(times)))
# 1=s, 2=s, 3=e, 5=s, 7=e, 8=e, 10=s, 11=s, 12=s, 13=e, 15=e, 16=e
num_of_e = 0
num_of_s = 0
first_s = 0
for time in times:
if first_s == 0:
first_s = time
if time not in end:
num_of_s += 1
if time in end:
num_of_e += 1
if num_of_e == num_of_s:
num_of_e = 0
num_of_s = 0
print [first_s, time]
first_s = 0
``````

Then, the questioner insisted that I should solve it by ordering the times first because "it's better" so I did the following

``````times = [[1,3],[10,15],[2,7],[11,13],[12,16],[5,8]]
def merge(a,b):
return[min(a[0],b[0]), max(a[1],b[1])]
times.sort()
# [1,3] [2,7] [5,8] [10,15] [11,13] [12,16]
cur = []
for time in times:
if not cur:
cur = time
continue
if time[0] > cur[0] and time[0] < cur[1]:
cur = merge(time,cur)
else:
print cur
cur = time
print cur
``````

Is there such thing as a "better" approach (or maybe another approach that could be better)? I know I could time it and see which one is faster or just evaluate based on big O notation (both O(N) for the actual work part).

Just wanted to see if you guys have any opinions on this?
Which one would you prefer and why?
Or maybe other ways to do it?

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## closed as primarily opinion-based by AlG, DesertIvy, Daniel Hedberg, mhlester, Lorenz MeyerApr 25 '14 at 19:23

Many good questions generate some degree of opinion based on expert experience, but answers to this question will tend to be almost entirely based on opinions, rather than facts, references, or specific expertise.If this question can be reworded to fit the rules in the help center, please edit the question.

(8 - 1 = 7) != (16 - 10 = 6), Am I missing something? – Grijesh Chauhan Apr 25 '14 at 18:03
your first approach is `O(n*log(n))` because of the initial sort. The loop on times is `O(n)`, so the overall is `O(nlogn)`. – njzk2 Apr 25 '14 at 18:04
@GrijeshChauhan: the OP's method prints all spans, finding the largest is then trivial – njzk2 Apr 25 '14 at 18:05
@GrijeshChauhan no. its not supposed to be same. it's to have the largest overlapping timestamp. [1,3] [2,7] [5,8] becomes [1,8] – ealeon Apr 25 '14 at 18:06
@njzk2 what about the second sort? – ealeon Apr 25 '14 at 18:08

Here is a suggestion for eluding the risks related to `time in end` time computation and specific cases issues:

``````times = [[1,3],[10,15],[2,7],[11,13],[12,16],[5,8]]
start = [(i[0], 0) for i in times]
end = [(i[1], 1) for i in times]
# Using 0 for start and 1 for end ensures that starts are resolved before ends
times = sorted(start + end)
span_count = 0
first_s = 0
for time, is_start in times:
if first_s == 0:
first_s = time
if is_start == 0:
span_count += 1
else:
span_count -= 1
if span_count == 0:
print [first_s, time]
first_s = 0
``````

Also, it has an easily computable complexity of `O(n) (actual work) + O(n*log(n)) (sort) = O(n*log(n))`

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Speed is often the most important consideration when evaluating an algorithm, but it may not be the only one. But let's look at speed first.

It this case, there are two kinds of speed to consider: asymptotic (which is what big Ω-Θ-O notation characterizes), and non-asymptotic. Even if two algorithms have the same asymptotic behavior, one may still perform considerably better than the other because of other costs in the algorithm that will be significant at smaller data sizes.

In your first algorithm you iterate through the list two times before sorting it, and then iterate through the list a third time after sorting it. In the second answer you only iterate through the list once. I would expect the second to be faster, but in Python, performance can sometimes be surprising, so it's good to measure if you need the speed.

You may also evaluate an algorithm's use of memory. Your first algorithm creates two temporary lists of start and end times, and a third temporary list holding the sorted time spans. Those could be expensive if the data set is large! The second algorithm avoids much of this, but creates a new list of length 2 each time `merge` is called. That could still be a significant amount of memory being allocated, and might be something to look at optimizing further. There may also be some memory use hidden behind the scenes: your use of `sort`, for example, may not in fact use much less memory than `sorted` does when you look at how it's implemented.

A final consideration when evaluating an algorithm is your audience. If you are in an interview, for example, speed and memory may not be as critical for your first attempt at implementing an algorithm as clarity and style.

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thank you for your input. – ealeon Apr 25 '14 at 18:33