Gyration Stability for Products
Abstract
A gyration is an operation on Poincar\'e Duality complexes that arises from a certain surgery on the product of a given complex N and a sphere, parametrised by a chosen twisting. Of particular recent interest is the notion of gyration stability; that is, N is gyration stable when all of its gyrations have the same homotopy type, regardless of the twisting used. We prove that a product N× M of two Poincar\'e Duality complexes is gyration stable when one of the product terms is itself gyration stable, and provide some examples of interest.
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