A criterion for double sliceness
Abstract
We describe a condition involving noncommutative Alexander modules which ensures that a knot with Alexander module Z[t 1]/(t-2) Z[t 1]/(t-1- 2) is topologically doubly slice. As an application, we show that a satellite knot Rη(K) is doubly slice if the pattern R has Alexander module Z[t 1]/(t- 2) Z[t 1]/(t-1- 2) and satisfies this condition, and if the infection curve η ⊂ S3 R lies in the second derived subgroup π1(S3 R)(2).
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