Corks with large shadow-complexity and exotic 4-manifolds
Abstract
We construct an infinite family \ Cn,k\k=1∞ of corks of Mazur type satisfying 2n≤ scsp(Cn,k)≤ O(n3/2) for any positive integer n. Furthermore, using these corks, we construct an infinite family \(Wn,k,W'n,k)\k=1∞ of exotic pairs of 4-manifolds with boundary whose special shadow-complexities satisfy the above inequalities. We also discuss exotic pairs with small shadow-complexity.
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