Finite order corks
classification
🧮 math.GT
keywords
corksorderfinitesteinapplyingboundariesboundarybranched
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We show that for any po sitive integer $m$, there exist order $n$ Stein corks. The boundaries are cyclic branched covers of slice knots embedded in the boundary of corks. By applying these corks to generalized forms, we give a method producing examples of many finite order corks, which are possibly not Stein cork.
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