Doubly slicing knots and embedding 3-manifolds in 4-manifolds

Abstract

For a knot K in the 3-sphere and a simply connected closed 4-manifold X, we define the X-double slice genus of K, extending the notion from the case when X is the 4-sphere. We show that for each integer n, there exists an algebraically doubly slice and ribbon knot K whose X-double slice genus is greater than n. Our arguments use new L2-signature obstructions to embedding closed 3-manifolds with infinite cyclic first homology into closed 4-manifolds with infinite cyclic fundamental group, in a way that preserves first homology. We also extend the concept of the superslice genus of a knot to simply connected 4-manifolds and show that there exist doubly slice knots whose generalized superslice genera are arbitrarily large. Furthermore, we define the double stabilizing number of a knot, extending the stabilizing number introduced by Conway and Nagel, and show that this invariant can also be arbitrarily large.