# Shell sort and insertion sort

I got a problem. I'm very confused over shell sort and insertion sort algorithms. How should we distinguish from each other?

-
They are completely different algorithms. –  sr01853 Jan 31 '13 at 6:24
But how it become different? Please explain... –  Rokai Jan 31 '13 at 6:27
Have you read the Wikipedia articles? They give very good explanations of the two algorithms. –  Jim Mischel Jan 31 '13 at 6:32
You can ask if you can distinguish one from the other algorithms or implementations. Assuming you actually want to compare implementations should look better on complexities of these algorithms for different types of inputs. –  user1929959 Jan 31 '13 at 8:59

You can implement insertion sort as a series of comparisons and swaps of contiguous elements. That makes it a "stable sort". Shell sort, instead, compares and swaps elements which are far from each other. That makes it faster.

I suppose that your confusion comes from the fact that shell sort can be implemented as several insertion sorts applied to different subsets of the data. Note that these subsets are composed of noncontiguous elements of the data sequence.

See the Wikipedia for more details ;-)

-
Short and sweet. thank you... –  Rokai Jan 31 '13 at 16:22

The insertion sort is a simple, in-place, O(N^2) sort. Shell sort is a little more complex and harder to understand, and somewhere around O(N^(5/4)). Check the links out for examples -- it should be easy to see the difference.

-

Shell sort is a generalized version of Insertion sort. The basic priciple is the same for both algorithms. You have a sorted sequence of length n and you insert the unsorted element into it - and you get n+1 elements long sorted sequence.

The difference follows: while Insertion sort works only with one sequence (initially the first element of the array) and expands it (using the next element). However, shell sort has a diminishing increment, which means, that there is a gap between the compared elements (initially n/2). Hence there are n/2 sequences to be sorted using insertion sort. In each step the increment is shrinked (often just divided by 2.2) and the number of sequences is reduced. In the last step there is no gap and the algorithm degenerates to simple insertion sort.

Because of the diminishing increment, the large and small elements are moved rapidly to correct part of the array and than in the last step sorted using insertion sort really fast. This leads to reduced time complexity O(n^(4/3))

-
This is a very good answer. All the facts are here. Thank you very much. –  Rokai Jan 31 '13 at 16:21
N/2 is not generally the optimal starting increment for Shell sorts. The Wikipedia article has a good section on choosing the increment. Otherwise a good answer. –  NealB Apr 23 '14 at 20:56