Are a and d your cup of tea? Revisited

Abstract

This is a revised version (of late 2020) of [Sh:700], which is arXiv:math/0012170 . First point is noting that the proof of Theorem 4.3 in [Sh:700], which says that the proof giving the consistency b = d = u < a also gives s = d . The proof uses a measurable cardinal and a c.c.c. forcing so it gives large d and assumes a large cardinal. Second point is adding to the results of 2,3 which say that (in 3 with no large cardinals) we can force 1 < b = d < a. We like to have 1 < s b = d < a . For this we allow in 2,3 the sets Kt to be uncountable; this requires non-essential changes. In particular, we replace usually 0, 1 by σ , ∂ . Naturally we can deal with i and similar invariants. Third we proofread the work again. To get s we could have retained the countability of the member of the It-s but the parameters would change with A ∈ It, well for a cofinal set of them; but the present seems simpler. We intend to continue in [Sh:F2009].