On the homotopy type of the space of fiberings of S1 × S2 by simple closed curves
Abstract
For most aspherical Seifert-fibered 3-manifolds M, the space of Seifert fiberings SF(M) is known to have contractible components. It is also known that the space of Hopf fiberings of the three-sphere is noncontractible. We provide the second example of a non-aspherical 3-manifold M such that SF(M) has noncontractible components. In particular, we show that certain components of SF(S1 × S2) are homotopy equivalent to a subspace homeomorphic to the identity-based loop space SO(3), and we exhibit second homology generators for both connected components of SF(S1 × S2).
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