Counterexamples to the simple loop conjecture in higher-dimension
Abstract
For every g 2 and n4, we provide an n-manifold M and a continuous 2-sided map f S M, where S is a closed genus g surface, such that no simple loop is contained in ker(\,f*\,). This provides a counterexample to the the classical simple loop conjecture for surfaces to manifolds of dimensions at least four.
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