Juan Carlos Martinez, Lajos Soukup
Published 2019-01-25Version 1
For any regular cardinal $\kappa$ and ordinal $\eta<\kappa^{++}$ it is consistent that $2^{\kappa}$ is as large as you wish, and every function $f:\eta \to [\kappa,2^{\kappa}]\cap Card$ with $f(\alpha)=\kappa$ for $cf(\alpha)<\kappa$ is the cardinal sequence of some locally compact scattered space.
Wide scattered spaces and morasses
The Special Aronszajn Tree Property at $κ^+$ and $\square_{κ, 2}$
Borel Conjecture and Dual Borel Conjecture
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