The groups S3 and SO(3) have no invariant binary k-network

Abstract

A family N of closed subsets of a topological space X is called a closed k-network if for each open set U⊂ X and a compact subset K⊂ U there is a finite subfamily F⊂ N with K⊂⊂ N. A compact space X is called supercompact if it admits a closed k-network N which is binary in the sense that each linked subfamily L⊂ N is centered. A closed k-network N in a topological group G is invariant if xAy∈ N for each A∈ N and x,y∈ G. According to a result of Kubi\'s and Turek, each compact (abelian) topological group admits an (invariant) binary closed k-network. In this paper we prove that the compact topological groups S3 and (3) admit no invariant binary closed k-network.