Borsuk's partition problem in four-dimensional p space

Abstract

In 1933, Borsuk made a conjecture that every n-dimensional bounded set can be divided into n+1 subsets of smaller diameter. Up to now, the problem is still open for 4≤ n≤ 63. In this paper, we firstly discuss the Banach-Mazur distance between the n-dimensional cube and the p ball (1≤ p< 2), then we study the generalized Borsuk's partition problem in metric spaces and prove that all bounded sets X in every four-dimensional p space can be divided into 24 subsets of smaller diameter.