Concordance structure set of connected sum of projective spaces
Abstract
In this paper, the concordance structure set of connected sums of complex and quaternionic projective spaces in the real n-dimensional range with 8≤ n≤ 16 is computed. It is demonstrated that the concordance inertia group of a connected sum equals the sum of individual concordance inertia groups. Furthermore, the concordance structure sets of manifolds and their connected sums are compared.
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