A preorder on the set of links with applications to symmetric unions

Abstract

For a link L in the 3-sphere, the π-orbifold group Gorb(L) is defined as a quotient of the link group G(L) of L. When there exists an epimorphism Gorb(L) Gorb(L') fitting into a certain commutative diagram, we define a relation L L' and explore the relationships between the two links. Specifically, we prove that if L L' and L is a Montesinos link with r rational tangles (r≥ 3), then L' is either a Montesinos link with at most r+1 rational tangles or a certain connected sum. We further show that if L is a small link, then there are only finitely many links L' satisfying L L'. In contrast, if L has determinant zero, then L L' for every 2-bridge link L'. Our main applications concern symmetric unions of knots. In particular, we provide a criterion showing that a given knot does not admit a symmetric union presentation.

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