Aronszajn trees on \(\aleph_2\) and \(\aleph_3\).

Smoke and mirrors: combinatorial properties of small cardinals equiconsistent with huge cardinals, THE TREE PROPERTY UP TO א_ω+1, Aronszajn trees and the successors of a singular cardinal, The tree property, THE TREE PROPERTY AT AND, The super tree property at the successor of a singular, Indestructibility of some compactness principles over models of \(\mathsf{PFA} \), INDESTRUCTIBILITY OF THE TREE PROPERTY, TREES AND STATIONARY REFLECTION AT DOUBLE SUCCESSORS OF REGULAR CARDINALS, The tree property and the continuum function below, Strong tree properties, Kurepa trees, and guessing models, PERFECT SUBSETS OF GENERALIZED BAIRE SPACES AND LONG GAMES, Power-like models of set theory, The consistency strength of successive cardinals with the tree property, The tree property below \(\aleph_{\omega \cdot 2}\), The special Aronszajn tree property, A remark on the tree property in a choiceless context, The tree property at the double successor of a singular cardinal with a larger gap, Fragility and indestructibility of the tree property, Strong tree properties for two successive cardinals, THE CLUB GUESSING IDEAL: COMMENTARY ON A THEOREM OF GITIK AND SHELAH, A Laver-like indestructibility for hypermeasurable cardinals, The tree property at $\aleph _{\omega +2}$ with a finite gap, Fragility and indestructibility. II, THE EIGHTFOLD WAY, The tree property at the first and double successors of a singular, The tree property at ℵ_ω+2, The definable tree property for successors of cardinals, Guessing models and the approachability ideal, Aronszajn and Kurepa trees, Strong tree properties for small cardinals, The tree property at double successors of singular cardinals of uncountable cofinality with infinite gaps, Diagonal supercompact Radin forcing, 𝐼[𝜔₂ can be the nonstationary ideal on 𝐶𝑜𝑓(𝜔₁)], Easton's theorem for the tree property below \(\aleph_\omega\), The tree property at the \(\aleph_{2 n}\)'s and the failure of SCH at \(\aleph_\omega\), Successive failures of approachability, Some applications of mixed support iterations, The tree property at first and double successors of singular cardinals with an arbitrary gap, THE HARRINGTON–SHELAH MODEL WITH LARGE CONTINUUM, The tree property at both ℵ_ω+1and ℵ_ω+2, \(\omega {}^*_ 2U(\omega_ 2)\) can be \(C^*\)-embedded in \(\beta \omega_ 2\), Small \(\mathfrak{u}(\kappa )\) at singular \(\kappa\) with compactness at \(\kappa^{++}\)

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• Proper forcing
• The Souslin problem
• Between Martin's Axiom and Souslin's Hypothesis
• Aronszajn trees and the independence of the transfer property