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# Recurrence in analysis of SELECT algorithm

In CLRS `(2/e, page 191, section 9.3)` the analysis of the `SELECT` algorithm for finding the ith smallest element in an array is presented with the following induction proof:

``````1.  T(n) <= c celing(n/5) + c(7n/10 + 6) + an
2.       <= cn/5 + c + 7cn/10 + 6c + an
3.       = 9cn/10 + 7c + an
4.       = cn + (-cn/10 + 7c + an)
5.       = cn,  when -cn/10 + 7c + an <= 0
``````

I understand the algorithm, but two manipulations in the proof have me stumped a bit.

Question 1: in line 2, where did the extra c term comee from (second term)? c multiplied through the `(7n/10 + 6)` term gives `7cn/10 + 6c`.

Question 2: in line 4, how did we get from `9cn/10` to `cn + (-cn/10 ...)`? Where did the 9 coefficient go?

This is not homework

Thank you!

-

1. The extra `c` is from `c*celing(n/5)` - consider `n/5 = 10.2` - then `c * ceiling(n/5) = 11c > cn/5` so we need to add an extra `c`.
2. `9cn/10 = (10-1)cn/10 = 10cn/10 - cn/10 = cn - cn/10 ... = cn + (-cn/10 ...)`