On decompositions of the real line

Abstract

Let Xt be a totally disconnected subset of the real line R for each t in R. We construct a partition Yt | t in R of R into nowhere dense Lebesgue null sets Yt such that for every t in R there exists an increasing homeomorphism from Xt onto Yt. In particular, the real line can be partitioned into 2aleph0 Cantor sets and also into 2aleph0 mutually non-homeomorphic compact subspaces. Furthermore we prove that for every cardinal number k with 2 ≤ k ≤ 2aleph0 the real line (as well as the Baire space R) can be partitioned into exactly k homeomorphic Bernstein sets and also into exactly k mutually non-homeomorphic Bernstein sets. We also investigate partitions of R into Marczewski sets, including the possibility that they are Luzin sets or Sierpinski sets.