Most Graphs are Knotted
Abstract
We present four models for a random graph and show that, in each case, the probability that a graph is intrinsically knotted goes to one as the number of vertices increases. We also argue that, for k ≥ 18, most graphs of order k are intrinsically knotted and, for k ≥ 2n+9, most of order k are not n-apex. We observe that p(n) = 1/n is the threshold for intrinsic knotting and linking in Gilbert's model.
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