Variants of Baumgartner's Axiom for Lipschitz Functions on Baire and Cantor Space
Abstract
We consider several variants of Baumgartner's axiom for 1-dense sets defined on the Baire and Cantor spaces in terms of Lipschitz functions with respect to the usual metric. A variation of Baumgartner's original argument shows that these variants are consistent. However, unlike in the case of the classical BA, we are able to give many applications for which the corresponding fact for linear orders is open. In particular we show that there are provable implications from the ωω variants to the 2ω variants and that some of these principles imply all the cardinals in the Cicho\'n's diagram are large. We also show, similar to (but not the same as) BA, that none of the Lipschitz variants follow from a large fragment of MA.
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