Generalized manifolds, normal invariants, and L-homology
Abstract
Let Xn be an arbitrary oriented closed generalized n-manifold, n 5. In our recent paper (Proc. Edinb. Math. Soc. (2) 63 (2020), no. 2, 597-607) we have constructed a map t:N(Xn) Hstn ( Xn; L+) which extends the normal invariant map for the case when Xn is a topological n-manifold. Here, N(Xn) denotes the set of all normal bordism classes of degree one normal maps (f,b): Mn Xn, and Hst* ( Xn; E) denotes the Steenrod homology of the spectrum E. An important nontrivial question arose whether the map t is bijective (note that this holds in the case that Xn is a topological n-manifold). It is the purpose of this paper to prove that the answer to this question is affirmative.
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