Circle actions and Suspension operations on Smooth manifolds
Abstract
Let M be a smooth manifold with M≥ 3 and a base point x0. Surgeries along the oriented circle S1× \x0\ on the product S1× M yields two manifolds 0M and 1M, called the suspensions of M. The suspension operations i play a basic role in the construction and classification of the smooth manifolds which admit free S1-actions. We illustrate this by a number of applications.
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