Intrinsic linking and knotting are arbitrarily complex

Abstract

We show that, given any n and α, every embedding of any sufficiently large complete graph in R3 contains an oriented link with components Q1, ..., Qn such that for every i =j, |(Qi,Qj)|≥α and |a2(Qi)|≥α, where a2(Qi) denotes the second coefficient of the Conway polynomial of Qi.

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