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# Maximum and minimum depth of quicksort

This was a problem of CLR (Introduction to Algorithms) The question goes as follow:

Suppose that the splits at every level of quicksort are in the proportion 1 - α to α, where 0 < α ≤ 1/2 is a constant. Show that the minimum depth of a leaf in the recursion tree is approximately - lg n/ lg α and the maximum depth is approximately -lg n/ lg(1 - α). (Don't worry about integer round-off.)http://integrator-crimea.com/ddu0043.html

I'm not getting how to reach this solution. as per the link they show that for a ratio of 1:9 the max depth is log n/log(10/9) and minimum log n/log(10). Then how can the above formula be proved. Please help me as to where am I going wrong as I'm new to Algorithms and Data Structures course.

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First, let us consider this simple problem. Assume you a number n and a fraction (between 0 and 1) p. How many times do you need to multiply n with p so that resulting number is less than or equal to 1?

n*p^k <= 1
log(n)+k*log(p) <= 0
log(n) <= -k*log(p)
k => -log(n)/log(p)


Now, let us consider your problem. Assume you send the shorter of the two segments to the left child and longer to the right child. For the left-most chain, the length is given by substituting \alpha as p in the above equation. For the right most chain, the length is calculated by substituting 1-\alpha as p. Which is why you have those numbers as answers.

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Can you explain how did you jump from np^k <= 1 to log(n)+klog(p) <= 0 – Andigor Feb 3 '15 at 9:29
log is a strictly increasing function (i.e. x>y>0, log(x)>log(y). log(1)=0 (that is the right side). log(xy) = log(x) + log(y), so log(np^k) = log(n) + log(p^k). log(x^y) = ylog(x), so log(p^k) = k*log(p). – ElKamina Feb 3 '15 at 17:44
ElKamina, thanks a lot! – Andigor Feb 3 '15 at 21:55