Ryo Nikkuni
Published 2009-07-01, updated 2009-08-12Version 4
In 1983, Conway-Gordon showed that for every spatial complete graph on 6 vertices, the sum of the linking numbers over all of the constituent 2-component links is congruent to 1 modulo 2, and for every spatial complete graph on 7 vertices, the sum of the Arf invariants over all of the Hamiltonian knots is also congruent to 1 modulo 2. In this article, we give integral lifts of the Conway-Gordon theorems above in terms of the square of the linking number and the second coefficient of the Conway polynomial. As applications, we give alternative topological proofs of theorems of Brown-Ramirez Alfonsin and Huh-Jeon for rectilinear spatial complete graphs which were proved by computational and combinatorial methods.
Comments: 17 pages, 10 figures
$\triangle Y$-exchanges and the Conway-Gordon theorems
Generalizations of the Conway-Gordon theorems and intrinsic knotting on complete graphs
Intrinsically linked graphs and even linking number
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