Borsuk's Problem in Metric Spaces
Abstract
In 1933, K. Borsuk proposed the following problem: Can every bounded set in En be divided into n+1 subsets of smaller diameters? In 1965, V. G. Boltyanski and I. T. Gohberg made the following conjecture: Every bounded set in an n-dimensional metric space can be divided into 2n subsets of smaller diameters. In this paper, we prove the following result: Every bounded set in an n-dimensional metric space can be divided into 2n((n+1) (n+1)+(n+1) (n+1)+5n+5) subsets of smaller diameters.
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