Tilings and coverings by balls in 1

Abstract

A famous result of Klee from 1981 is that the Banach space 1() admits a disjoint tiling by balls of radius 1, for all cardinals with ω =. Klee also observed that the smallest cardinal in which such a tiling might exist is = 20, leaving open the question whether, for < 20, 1() might admit a tiling by balls at all. Our main result answers this question in the negative, proving in particular that 1 does not admit any tiling by balls. We also give a companion result about star-n-finite coverings by balls of 1() and we give a construction of a star-finite tiling of X ∞ c00, for each space X whose dimension is at most countable.