Continuous cofinal maps on ultrafilters

Abstract

An ultrafilter U on a countable base has continuous Tukey reductions if whenever an ultrafilter V is Tukey reducible to U, then every monotone cofinal map f:U is continuous when restricted to some cofinal subset of U. In the first part of the paper, we give mild conditions under which the property of having continuous Tukey reductions is inherited under Tukey reducibility. In particular, if U is Tukey reducible to a p-point then U has continuous Tukey reductions. In the second part, we show that any countable iteration of Fubini products of p-points has Tukey reductions which are continuous with respect to its topological Ramsey space of U-trees.