The iterated logarithm is the number of times the logarithm has to be applied before the result becomes one or less.
It's called iterated logarithm function. It is a very slowly growing function. For example:
Or in the case of Big O it could pretty much be considered as constant time.
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.
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