Finite Quotient of Join in Alexandrov Geometry

Abstract

Given two ni-dimensional Alexandrov spaces Xi of curvature 1, the join of X1 and X2 is an (n1+n2+1)-dimensional Alexandrov space X of curvature 1, which contains Xi as convex subsets such that their points are π2 apart. If a group acts isometrically on a join that preserves Xi, then the orbit space is called quotient of join. We show that an n-dimensional Alexandrov space X with curvature 1 is isometric to a finite quotient of join, if X contains two compact convex subsets Xi without boundary such that X1 and X2 are at least π2 apart and (X1)+(X2)=n-1.