Insertion Sort – Data Structure and Algorithm Tutorials

Insertion sort is a simple sorting algorithm that works similar to the way you sort playing cards in your hands. The array is virtually split into a sorted and an unsorted part. Values from the unsorted part are picked and placed at the correct position in the sorted part.

Insertion Sort Algorithm

To sort an array of size N in ascending order iterate over the array and compare the current element (key) to its predecessor, if the key element is smaller than its predecessor, compare it to the elements before. Move the greater elements one position up to make space for the swapped element.

Working of Insertion Sort algorithm

Consider an example: arr[]: {12, 11, 13, 5, 6}

12	11	13	5	6

First Pass:

• Initially, the first two elements of the array are compared in insertion sort.

12	11	13	5	6

• Here, 12 is greater than 11 hence they are not in the ascending order and 12 is not at its correct position. Thus, swap 11 and 12.
• So, for now 11 is stored in a sorted sub-array.

11	12	13	5	6

Second Pass:

•  Now, move to the next two elements and compare them

11	12	13	5	6

• Here, 13 is greater than 12, thus both elements seems to be in ascending order, hence, no swapping will occur. 12 also stored in a sorted sub-array along with 11

Third Pass:

• Now, two elements are present in the sorted sub-array which are 11 and 12
• Moving forward to the next two elements which are 13 and 5

11	12	13	5	6

• Both 5 and 13 are not present at their correct place so swap them

11	12	5	13	6

• After swapping, elements 12 and 5 are not sorted, thus swap again

11	5	12	13	6

• Here, again 11 and 5 are not sorted, hence swap again

5	11	12	13	6

• Here, 5 is at its correct position

Fourth Pass:

• Now, the elements which are present in the sorted sub-array are 5, 11 and 12
• Moving to the next two elements 13 and 6

5	11	12	13	6

• Clearly, they are not sorted, thus perform swap between both

5	11	12	6	13

• Now, 6 is smaller than 12, hence, swap again

5	11	6	12	13

• Here, also swapping makes 11 and 6 unsorted hence, swap again

5	6	11	12	13

• Finally, the array is completely sorted.

Illustrations:

 

Implementation of Insertion Sort Algorithm

Below is the implementation of the iterative approach:

5 6 11 12 13 

Time Complexity: O(N^2) 
Auxiliary Space: O(1)

Complexity Analysis of Insertion Sort:

Time Complexity of Insertion Sort

• The worst-case time complexity of the Insertion sort is O(N^2)
• The average case time complexity of the Insertion sort is O(N^2)
• The time complexity of the best case is O(N).

Space Complexity of Insertion Sort

The auxiliary space complexity of Insertion Sort is O(1)

Characteristics of Insertion Sort

• This algorithm is one of the simplest algorithms with a simple implementation
• Basically, Insertion sort is efficient for small data values
• Insertion sort is adaptive in nature, i.e. it is appropriate for data sets that are already partially sorted.

Frequently Asked Questions on Insertion Sort

Q1. What are the Boundary Cases of the Insertion Sort algorithm?

Insertion sort takes the maximum time to sort if elements are sorted in reverse order. And it takes minimum time (Order of n) when elements are already sorted. 

Q2. What is the Algorithmic Paradigm of the Insertion Sort algorithm?

The Insertion Sort algorithm follows an incremental approach.

Q3. Is Insertion Sort an in-place sorting algorithm?

Yes, insertion sort is an in-place sorting algorithm.

Q4. Is Insertion Sort a stable algorithm?

Yes, insertion sort is a stable sorting algorithm.

Q5. When is the Insertion Sort algorithm used?

Insertion sort is used when number of elements is small. It can also be useful when the input array is almost sorted, and only a few elements are misplaced in a complete big array.