Worst-case complexity

Given a model of computation and an algorithm A that halts on each input x, the mapping t_A:{0, 1}*→N is called the time complexity of A if, for every x, A halts after exactly t_A(x) steps.

Since we usually are interested in the dependence of the time complexity on different input length, abusing terminology, the time complexity is sometimes referred to the mapping T_A:N→N, defined by T_A(n):= max_{x∈{0, 1}ⁿ}{t_A(x)}.

Similar definitions can be given for space complexity, randomness complexity, etc.

Consider performing insertion sort on n numbers on a random access machine. The best-case for the algorithm is when the numbers are already sorted, which takes O(n) steps to perform the task. However, the input in the worst-case for the algorithm is when the numbers are reverse sorted and it takes O(n²) steps to sort them; therefore the worst-case time-complexity of insertion sort is of O(n²).

Analysis of algorithms

Big-O Notation

• Thomas H. Cormen, Charles E. Leiserson, Ronald L. Rivest, and Clifford Stein. Introduction to Algorithms, Second Edition. MIT Press and McGraw-Hill, 2001. ISBN 0-262-03293-7. Chapter 2.2: Analyzing algorithms, pp.25-27.
• Oded Goldreich. Computational Complexity: A Conceptual Perspective. Cambridge University Press, 2008. ISBN 0-521-88473-X, p.32.