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Rigidity of self-maps of $V_{n,2}$ and manifolds tangentially homotopy equivalent to $V_{n,2} \times S^k$

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abstract

We study two problems concerning the Stiefel manifolds $V_{n,2}$ and their products with spheres. First, we address a rigidity problem: we determine, for most values of~$n$, all self-maps of $V_{n,2}$ that are homotopic to an almost diffeomorphism. Second, we classify smooth closed manifolds tangentially homotopy equivalent to $V_{n,2} \times S^k$ up to almost diffeomorphism, for $k = 3, 5$ or $7 \leq k, k \neq 2^i - 2 \ \text{and} \ Dim(V_{n,2} \times S^k) \neq 2^i - 2$. Our method is to find explicit inverses in the structure set via normal invariants of specific tangential homotopy equivalences. In favourable cases -- notably $V_{12,2} \times S^3$, $V_{16,2} \times S^3$, $V_{10,2} \times S^5$ -- the classification is complete: every such manifold is almost diffeomorphic to $V_{n,2} \mathbin{\#} \Sigma \times S^k$ for some exotic sphere $\Sigma$. In the general case, we identify inverses for a large subgroup of $\operatorname{Im}(\eta)$ and provide a reasonable direction for the remainder.

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math.AT 1

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2026 1

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Smooth manifolds homotopy equivalent to products of spheres

math.AT · 2026-06-08 · unverdicted · novelty 7.0

Classifies smooth closed oriented manifolds homotopy equivalent to three families of sphere products up to almost diffeomorphism by realizing the image of the normal-invariant map with explicit constructions from bundles and plumbings.

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  • Smooth manifolds homotopy equivalent to products of spheres math.AT · 2026-06-08 · unverdicted · none · ref 2 · internal anchor

    Classifies smooth closed oriented manifolds homotopy equivalent to three families of sphere products up to almost diffeomorphism by realizing the image of the normal-invariant map with explicit constructions from bundles and plumbings.