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Let Fⁿ be a connected, smooth and closed n-dimensional manifold. We call Fⁿ a manifold with property when it has the following property: if $N^{m}$ is any smooth closed m-dimensional manifold with m > n and $T : N^{m} \to N^{m}$ is a smooth involution whose fixed point set is Fⁿ, then m = 2n. Examples of manifolds with this property are: the real, complex and quaternionic even-dimensional projective spaces $R P^{2 n}$ , $C P^{2 n}$ and $H P^{2 n}$ , and the connected sum of $R P^{2 n}$ and any number of copies of Sⁿ × Sⁿ, where Sⁿ is the n-sphere and n is not...

Compactness Results for Orbifold Instantons.

Terry Lawson (1988/1989)

Mathematische Zeitschrift

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Cobordism of Morse functions on surfaces, the universal complex of singular fibers and their application to map germs.

Cobordism Span of a Manifold and Elliptic Genera.

Cobordisme des entrelacs

Cobordismes de plongments et produits homotopiques

Commuting involutions whose fixed point set consists of two special components

Compactness Results for Orbifold Instantons.

Currently displaying 1 – 6 of 6