I have the understanding about the BigOh notation. But how do I interpret what does O(O(f(n))) mean? Does it mean growth rate of the growth rate?
x = O(n)
basically means x <= kn
for some constant k
.
Thus x = O((O(n))
means x <= pO(n)
for some constant p
, which means x <= pqn
for some constant q
.
Let k = pq
.
Then x = O((O(n)) = O(n)
.
In other words, O(O(f(n))) = O(f(n))
.
I am curious, where did you see such notation being used?
From a BigOh point of view:
g(n) = O(f(n))
means g(n) <= K*f(n)
for some K (and after some n1)
But then h(n) = O(O(f(n))
would mean something like h(n) <= L * M * f(n)
for some L, M, after some n > n1, n2
.

1

Where the hell do you learn this stuff? I find it somewhat alien, yet fascinating. – jay_t55 Sep 14 '14 at 22:56

O
is a function that accepts a function as it's argument, and thatO
andf
share signature. – AlexanderBrevig Sep 14 '14 at 22:47