1-Uryson width and covers

Abstract

We investigate the following question: Do there exist Riemannian polyhedra X such that the 1-Uryson width of their universal covers UW1(X) is bounded but UW1(X) is arbitrarily large? We rule out two specific cases: when π1(X) is virtually cyclic and when X is a Riemannian surface. More specifically, we show that if X is a compact polyhedron with a virtually cyclic fundamental group, then its 1-Uryson width is bounded by the 1-Uryson width of its universal cover X. Precisely: UW1(X) ≤ 6 · UW1(X). We show that if X is a Riemannian surface with boundary then UW1(X) ≤ UW1(X). Furthermore, we show that if there exist spaces X for which UW1(X) is bounded while UW1(X) is arbitrarily large, then such examples must already appear in low dimensions. In particular, such X can be found among Riemannian 2-complexes.