Master Method

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Overview

The master method is a method of analyzing running time of recursive algorithms by using the "master theorem". The master theorem applies to algorithms whose running times can be expressed as a recurrence equation. A generic form of a recurrence equation is:

T(n) = a⋅T(n/b) + f(n)

where a ≥ 1, b > 1 and f(n) is a function that approximates the non-recursive cost. Note that the above expression does include a boundary condition for n = 1. The reasons is that T(1) does not significantly change the solution to the recurrence, it may change it with a constant factor, but the order of growth will stay unchanged.

TODO CLRS page 93.

TODO integrate after class:


Integrate class https://www.coursera.org/learn/algorithms-divide-conquer/lecture/HkcdO/formal-statement

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