There are No Product and Subgroup Theorems for the Covering Dimension of Topological Groups
Abstract
Strongly zero-dimensional topological groups G1, G2, and G such that G1× G2 has positive covering dimension and G contains a closed subgroup of positive covering dimension are constructed. Moreover, all finite powers of G1 are Lindel\"of and G2 is second-countable. An example of a strongly zero-dimensional space X whose free, free Abelian, and free Boolean topological groups have positive covering dimension is also given.
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