Cohomotopy Sets of (n-1)-connected (2n+2)-manifolds for small n

Abstract

Let M be a closed orientable (n-1)-connected (2n+2)-manifold, n≥ 2. In this paper we combine the Postnikov tower of spheres and the homotopy decomposition of the reduced suspension space M to investigate the cohomotopy sets π(M) for n=2,3,4, under the assumption that M has 2-torsion-free homology. All cohomotopy sets πi(M) of such manifolds M are characterized except π4(M) for n=3,4.

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