Smoothly slice links in CP2 \# CP2
Abstract
We show that there exists a link with 2 components which is not smoothly slice in CP2 \# CP2. By contrast, it is well-known that every knot (i.e., link with 1 component) is smoothly slice therein. Our proof uses classical topological and smooth obstructions, as well as constructive arguments to exploit the symmetries of the problem. As a consequence, we show that there are infinitely many integer homology 3-spheres such that if any of them bounds a ribbon integer homology 4-ball, than there exists an exotic CP2 \# CP2.
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