$(H,G)$-coincidence theorems for manifolds and a topological Tverberg type theorem for any natural number $r$

TL;DR

This paper develops new $(H,G)$-coincidence theorems for manifolds, providing bounds on the cohomological dimension of coincidence sets, and introduces a topological Tverberg type theorem applicable to all natural numbers, extending classical results.

Contribution

It introduces novel $(H,G)$-coincidence theorems for manifolds and proves a topological Tverberg type theorem valid for any natural number, broadening the scope of classical topological combinatorics.

Findings

Estimates the cohomological dimension of coincidence sets.

Provides a topological Tverberg type theorem for all natural numbers.

Generalizes Van Kampen-Flores type theorem.

Abstract

Let $X$ be a paracompact space, let $G$ be a finite group acting freely on $X$ and let $H$ a cyclic subgroup of $G$ of prime order $p$. Let $f:X\rightarrow M$ be a continuous map where $M$ is a connected $m$-manifold (orientable if $p>2$) and $f^* (V_k) = 0$, for $k\geq 1$, where $V_k$ are the $Wu$ classes of $M$. Suppose that ${\rm{ind}}\, X\geq n> (|G|-r)m$, where $r=\frac{|G|}{p}$. In this work, we estimate the cohomological dimension of the set $A(f,H,G)$ of $(H,G)$-coincidence points of $f$. Also, we estimate the index of a $(H, G)$-coincidence set in the case that $H$ is a $p$-torus subgroup of a particular group $G$ and as application we prove a topological Tverberg type theorem for any natural number $r$. Such result is a weak version of the famous topological Tverberg conjecture, which was proved recently, fail for all $r$ that are not prime powers. Moreover, we obtain a generalized Van Kampen-Flores type theorem for any natural number $r$.