Locally flat simple spheres in C P2

Abstract

The fundamental group of the complement of a locally flat surface in a 4-manifold is called the knot group of the surface. In this article we prove that two locally flat 2-spheres in C P2 with knot group Z2 are ambiently isotopic if they are homologous. This combines with work of Tristram and Lee-Wilczy\'nski, as well as the classification of Z-surfaces, to complete a proof of the statement: a class d ∈ H2(C P2) Z is represented by a locally flat 2-sphere with abelian knot group if and only if |d| ∈ 0,1,2; and this sphere is unique up to ambient isotopy.

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