# Interviewstreet's Insertion sort program

I tried to program Interiewstreet's Insertion sort challenge Link for the challenge in Python and here is my code shown below.

The program runs fine for a limit(which I'm not sure of) of input elements, but returns a false output for inputs of larger sizes. Can anyone guide me what am I doing wrong?

``````# This program tries to identify number of times swapping is done to sort the input array

"""
=>Get input values and print them
=>Get number of test cases and get inputs for those test cases
=>Complete Insertion sort routine
=>Add a variable to count the swapping's
"""

def sort_swap_times(nums):
""" This function takes a list of elements and then returns the number of times
swapping was necessary to complete the sorting
"""

times_swapped = 0L
# perform the insertion sort routine
for j in range(1, len(nums)):
key = nums[j]
i = j - 1
while i >= 0 and nums[i] > key:
# perform swap and update the tracker
nums[i + 1] = nums[i]
times_swapped += 1
i = i - 1
# place the key value in the position identified
nums[i + 1] = key

return times_swapped

# get the upper limit.
limit = int(raw_input())
swap_count = []

# get the length and elements.
for i in range(limit):
length = int(raw_input())
elements_str = raw_input() # returns a list of strings

# convert the given elements from str to int
elements_int = map(int, elements_str.split())

# pass integer elements list to perform the sorting
# get the number of times swapping was needed and append the return value to swap_count list
swap_count.append(sort_swap_times(elements_int))

# print the swap counts for each input array
for x in swap_count:
print x
``````
-
gives wrong output if which integer has larger value? –  Ivaylo Strandjev Jan 12 '13 at 13:28
@izomorphius, The site contains a list of test cases to run on the program –  kunaguvarun Jan 12 '13 at 13:58
What do you mean by false outputs - TLE or WA? –  sidi Jan 13 '13 at 1:55
@I got TLE error messages and only a few test cases passed –  kunaguvarun Jan 13 '13 at 6:54

Your algorithm is correct, but this is a naive approach to the problem and will give you a Time Limit Exceed signal on large test cases (i.e., len(nums) > 10000). Let's analyze the run-time complexity of your algorithm.

``````for j in range(1, len(nums)):
key = nums[j]
i = j - 1
while i >= 0 and nums[i] > key:
# perform swap and update the tracker
nums[i + 1] = nums[i]
times_swapped += 1
i = i - 1
# place the key value in the position identified
nums[i + 1] = key
``````

The number of steps required in the above snippet is proportional to 1 + 2 + .. + len(nums)-1, or len(nums)*(len(nums)-1)/2 steps, which is O(len(nums)^2).

Hint:

Use the fact that all values will be within [1,10^6]. What you are really doing here is finding the number of inversions in the list, i.e. find all pairs of i < j s.t. nums[i] > nums[j]. Think of a data structure that allows you to find the number of swaps needed for each insert operation in logarithmic time complexity. Of course, there are other approaches.

Spoiler:

-
Thanks, I'll learn those approaches first. –  kunaguvarun Jan 13 '13 at 6:55