On π2-separated subsets of Alexandrov spaces with curvature ≥1

Abstract

Let M be an n-dimensional Alexandrov space with curvature ≥ 1, and let \q1,·s,qk\ be any π2-separated subset in M (i.e. the distance |qiqj|≥π2 for any i≠ j). Under the additional conditions "|qiqj|<π" and "the diameter (M)≤ π2", we respectively give the upper bound of k (which depends only on n), and we classify the (topological or geometric) structure of M when k attains the upper bound.