Topological transversals to a family of convex sets
arXiv:1006.0104 · doi:10.1007/s00454-010-9282-z
Abstract
Let $\mathcal F$ be a family of compact convex sets in $\mathbb R^d$. We say that $\mathcal F $ has a \emph{topological $Ï$-transversal of index $(m,k)$} ($Ï<m$, $0<k\leq d-m$) if there are, homologically, as many transversal $m$-planes to $\mathcal F$ as $m$-planes containing a fixed $Ï$-plane in $\mathbb R^{m+k}$. Clearly, if $\mathcal F$ has a $Ï$-transversal plane, then $\mathcal F$ has a topological $Ï$-transversal of index $(m,k),$ for $Ï<m$ and $k\leq d-m$. The converse is not true in general. We prove that for a family $\mathcal F$ of $Ï+k+1$ compact convex sets in $\mathbb R^d$ a topological $Ï$-transversal of index $(m,k)$ implies an ordinary $Ï$-transversal. We use this result, together with the multiplication formulas for Schubert cocycles, the Lusternik-Schnirelmann category of the Grassmannian, and different versions of the colorful Helly theorem by Bárány and Lovász, to obtain some geometric consequences.