# What does “log*” mean?

I have come across the term O(log* N) in a book I'm reading on data structures. What does log* mean? I cannot find it on Google, and WolframAlpha doesn't understand it either.

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"I cannot find it on Google". Googling for 'log star' works fine. –  Joren Sep 26 '10 at 12:33
try "iterated logarithm of x from 0 to 6" or "IteratedLog(4)" in WolframAlpha –  vokilam Feb 1 at 8:52

It's iterated logarithm. See here for a description of lots of different time complexities, and here for more details on the iterated logarithm itself.

The iterated logarithm is the number of times the logarithm has to be applied before the result becomes one or less.

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It's called iterated logarithm function. It is a very slowly growing function. For example:

• lg*(2) = 1
• lg*(4) = 2
• lg*(16) = 3
• lg*(65536) = 4
• lg*(2^65536) = 5 /note that (2^65536) is much larger than the number of atoms in the observable universe/

Or in the case of Big O it could pretty much be considered as constant time.

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More succinctly, the iterated logarithm counts the number of times you would have to take the logarithm to reduce a number to 1. –  Tyler McHenry Sep 26 '10 at 11:49
So the inverse would be iterated exponentiation, which is the next in the sequence: addition, multiplication (=iterated addition), exponentiation (=iterated multiplication), ... –  Evgeni Sergeev Sep 30 '13 at 7:47
Hmm, what about iterated iteration... –  Evgeni Sergeev Sep 30 '13 at 7:50

log* (n)- "log Star n" as known as "Iterated logarithm"

In simple word you can assume log* (n)= log(log(log(.....(log* (n))))

log* (n) is very powerful.

Example:

1) Log* (n)=5 where n= Number of atom in universe

2) Tree Coloring using 3 colors can be done in log*(n) while coloring Tree 2 colors are enough but complexity will be O(n) then.

3) Finding the Delaunay triangulation of a set of points knowing the Euclidean minimum spanning tree: randomized O(n log* n) time.

I hope you can Visualize Log* (n) like this on WolframAlpha Check here

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