Mapping degrees between spherical 3-manifolds
Abstract
Let D(M,N) be the set of integers that can be realized as the degree of a map between two closed connected orientable manifolds M and N of the same dimension. For closed 3-manifolds with S3-geometry M and N, every such degree deg f deg (|π1(N)|) where 0 deg <|π1(N)| and deg only depends on the induced homomorphism =fπ on the fundamental group. In this paper, we calculate explicitly the set \deg\ when is surjective and then we show how to determine deg() for arbitrary homomorphisms. This leads to the determination of the set D(M,N).
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