Borel's Conjecture in Topological Groups

Abstract

We introduce a natural generalization of Borel's Conjecture. For each infinite cardinal number , let BC denote this generalization. Then BC_0 is equivalent to the classical Borel conjecture. Assuming the classical Borel conjecture, BC_1 is equivalent to the existence of a Kurepa tree of height 1. Using the connection of BC with a generalization of Kurepa's Hypothesis, we obtain the following consistency results: (1)If it is consistent that there is a 1-inaccessible cardinal then it is consistent that BC_1. (2)If it is consistent that BC_1 holds, then it is consistent that there is an inaccessible cardinal. (3)If it is consistent that there is a 1-inaccessible cardinal with ω inaccessible cardinals above it, then BC_ω \, +\, (∀ n<ω) BC_n is consistent. (4)If it is consistent that there is a 2-huge cardinal, then it is consistent that BC_ω. (5)If it is consistent that there is a 3-huge cardinal, then it is consistent that BC holds for a proper class of cardinals of countable cofinality.