Sorting Algorithms: Difference between revisions

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The numbers we wish to sort are also known as '''keys'''.  In practice, it is rarely the case when the keys exist in isolation. Usually they are part of a larger structure called '''record''', which also contains '''satellite data'''.  
The numbers we wish to sort are also known as '''keys'''.  In practice, it is rarely the case when the keys exist in isolation. Usually they are part of a larger structure called '''record''', which also contains '''satellite data'''.  
<span id='Comparison_Sort'></span>A sorting algorithm may compare keys, and in this case it is said to be a '''key comparison algorithm'''. It can be demonstrated that a key comparison algorithm [[Comparison_Sorting_Algorithms_Complexity|cannot perform better than n lg n]]. The worst-case running time of comparison sort algorithms is Ω(n lgn).
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<span id='Non-Comparison_Sort'></span>'''Non-comparison sort'''.
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Sorting algorithms characteristics:
Sorting algorithms characteristics:
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=Sorting Algorithms=
=Sorting Algorithms=


==Key Comparison Algorithms==
==<span id='Comparison_Sort'></span>Key Comparison Sorting Algorithms==
 
A sorting algorithm may compare keys, and in this case it is said to be a '''key comparison algorithm'''. It can be demonstrated that a key comparison algorithm [[Comparison_Sorting_Algorithms_Complexity|cannot perform better than n lg n]]. The worst-case running time of comparison sort algorithms is Ω(n lgn).


* [[Insertion Sort#Overview|Insertion sort]]
* [[Insertion Sort#Overview|Insertion sort]]
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* [[Heap Sort#Overview|Heap sort]]
* [[Heap Sort#Overview|Heap sort]]
* [[Quick Sort#Overview|Quick sort]]
* [[Quick Sort#Overview|Quick sort]]
==<span id='Non-Comparison_Sort'></span>Non-Comparison Sorting Algorithms==
* [[Counting Sort|counting sort]]

Revision as of 00:41, 10 August 2018

Internal

Overview

Many programs use sorting as an intermediate step, and that is why sorting is considered a fundamental operation in computer science.

The sorting problem if formally defined as follows: given a sequence of n numbers (a1, a2, ... an) provided as input, the algorithm must produce as output a permutation (reordering) (a'1, a'2, ... a'n) of the input sequence such that a'1 ≤ a'2 ≤ ... ≤ a'n. A specific input sequence is called an instance of the sorting problem. Although conceptually we are sorting a sequence, the input comes to the sorting function as an array with n elements.

The numbers we wish to sort are also known as keys. In practice, it is rarely the case when the keys exist in isolation. Usually they are part of a larger structure called record, which also contains satellite data.

Sorting algorithms characteristics:

  • in place: a sorting algorithm is said to sort the input numbers "in place" if it rearranges the numbers within the input array, while at most a constant number of elements are stored outside the array at any time.
  • stability

Sorting Algorithms

Key Comparison Sorting Algorithms

A sorting algorithm may compare keys, and in this case it is said to be a key comparison algorithm. It can be demonstrated that a key comparison algorithm cannot perform better than n lg n. The worst-case running time of comparison sort algorithms is Ω(n lgn).

Non-Comparison Sorting Algorithms