The diameter of random Cayley digraphs of given degree
Abstract
We consider random Cayley digraphs of order n with uniformly distributed generating set of size k. Specifically, we are interested in the asymptotics of the probability such a Cayley digraph has diameter two as n∞ and k=f(n). We find a sharp phase transition from 0 to 1 at around k = n n. In particular, if f(n) is asymptotically linear in n, the probability converges exponentially fast to 1.
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