NewEvery arXiv paper, its researchers & institutions — mapped.
paper

Dual submanifolds in rational homology spheres

arXiv:1701.00195 · doi:10.1007/s11425-017-9130-9

Abstract

Let $Σ$ be a simply connected rational homology sphere. A pair of disjoint closed submanifolds $M_+, M_-$ in $Σ$ are called dual to each other if the complement $Σ- M_+$ strongly homotopy retracts onto $M_-$ or vice-versa. In this paper we will give a complete answer of which integral triples $(n; m_+, m_-)$ can appear, where $n=dim Σ-1$, $m_+={codim}M_+ -1$ and $m_-={codim}M_- -1$.