Intrinsic linking with linking numbers of specified divisibility

Abstract

Let n, q and r be positive integers, and let KNn be the n-skeleton of an (N-1)-simplex. We show that for N sufficiently large every embedding of KNn in R2n+1 contains a link L1·s Lr consisting of r disjoint n-spheres, such that the linking number link(Li,Lj) is a nonzero multiple of q for all i≠ j. This result is new in the classical case n=1 (graphs embedded in R3) as well as the higher dimensional cases n≥ 2; and since it implies the existence of a link L1·s Lr such that |link(Li,Lj)|≥ q for all i≠ j, it also extends a result of Flapan et al. from n=1 to higher dimensions. Additionally, for r=2 we obtain an improved upper bound on the number of vertices required to force a two-component link L1 L2 such that link(L1,L2) is a nonzero multiple of q. Our new bound has growth O(nq2), in contrast to the previous bound of growth O(n4nqn+2).