Fixed point sets of homeomorphisms of metric products

Abstract:

In this paper it is investigated as to when a nonempty closed subset $A$ of a metric product $X$ containing intervals or spheres as factors can be the fixed point set of an autohomeomorphism of $X$. It is shown that if $X$ is the Hilbert cube $Q$ or contains either the real line $R$ or a $(2n - 1)$-sphere ${S^{2n - 1}}$ as a factor, then $A$ can be any nonempty closed subset. In the case where $A$ is in $\operatorname {Int}({B^{2n + 1}}{\text {)}}$, the interior of the closed unit $(2n + 1) - {\text {ball }}{B^{2n + 1}},$, a strong necessary condition is given. In particular, for ${B^3},A$ can neither be a nonamphicheiral knot nor a standard closed or nonplanar bordered surface.