S2-bundles over 2-orbifolds
Abstract
Let M be a closed 4-manifold with π2(M)Z. Then M is homotopy equivalent to either CP2, or the total space of an orbifold bundle with general fibre S2 over a 2-orbifold B, or the total space of an RP2-bundle over an aspherical surface. If π=π1(M)=1 there are at most two such bundle spaces with given action u:πAut(π2(M)). The bundle space has the geometry S2×E2 (if (M)=0) or S2×H2 (if (M)<0), except when B is orientable and π is generated by involutions, in which case the action is unique and there is one non-geometric orbifold bundle.
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