Configurations of spheres in \#n C P2
Abstract
By taking the complements of embeddings of sphere plumbings in connected sums of C P2, we construct examples of simply connected four-manifolds with lens space boundary and b2 = 1. The resulting boundaries include many lens spaces that cannot come from integer surgery on any knot in S3, so the corresponding four-manifolds cannot be built by attaching a single two-handle to B4. Using similar constructions, we give an example of an embedded sphere in \#4 C P2 with self-intersection number 20, and conjecture that this is the maximum possible.
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