7.10. Summary¶

A sequential search is \(O(n)\) for ordered and unordered lists.
A binary search of an ordered list is \(O(\log n)\) in the worst case.
Hash tables can provide constant time searching.
A bubble sort, a selection sort, and an insertion sort are \(O(n^{2})\) algorithms.
A shell sort improves on the insertion sort by sorting incremental sublists. It falls between \(O(n)\) and \(O(n^{2})\).
A merge sort is \(O(n \log n)\), but requires additional space for the merging process.
A quick sort is \(O(n \log n)\), but may degrade to \(O(n^{2})\) if the split points are not near the middle of the list. It does not require additional space.