Powers of regular cardinals

Indestructibility properties of Ramsey and Ramsey-like cardinals, Prikry-type forcing and the set of possible cofinalities, A general tool for consistency results related to I1, Injectivity, Projectivity, and the Axiom of Choice, A power function with a fixed finite gap everywhere, A guide to “Coding the universe” by Beller, Jensen, Welch, Covering the separation properties in the Easton model, Cardinal invariants above the continuum, A modal logic of consistency, Minimal pseudocompact group topologies on free abelian groups, Chains, antichains, and complements in infinite partition lattices, The Weight of a Pseudocompact (Homogeneous) Space Whose Cardinality Has Countable Cofinality, Set theoretical analogues of the Barwise-Schlipf theorem, Patterns of stationary reflection, Easton's theorem in the presence of Woodin cardinals, Possible values for \(2^{\aleph_n}\) and \(2^{\aleph_\omega}\), Chains of pseudocompact group topologies, Cardinal invariants and independence results in the poset of precompact group topologies, A characterization of cardinals \(\kappa\) such that \(2^{\lambda}=2^{\kappa}\) whenever \(\kappa \leq \lambda <2^{\kappa}\), In memoriam: James Earl Baumgartner (1943--2011), On supercompactness and the continuum function, Scales at \({\aleph_{\omega} }\), Interview With a Set Theorist, Sigma-Prikry forcing. III: Down to \(\aleph_{\omega}\), Negating the Galvin property, The tree property below \(\aleph_{\omega \cdot 2}\), Global singularization and the failure of SCH, Singular Cardinals and the PCF Theory, The Mathematical Development of Set Theory from Cantor to Cohen, Universal graphs without instances of CH: Revisited, Rank-into-rank hypotheses and the failure of GCH, Forcing Axioms, Supercompact Cardinals, Singular Cardinal Combinatorics, Easton's theorem and large cardinals, The higher Cichoń diagram, Model theory of the regularity and reflection schemes, SQUARES, SCALES AND STATIONARY REFLECTION, ZFC PROVES THAT THE CLASS OF ORDINALS IS NOT WEAKLY COMPACT FOR DEFINABLE CLASSES, Asymptotic Quasi-completeness and ZFC, On topological spaces of singular density and minimal weight, I0 and rank-into-rank axioms, Core models, A Model in Which GCH Holds at Successors but Fails at Limits, Labelling classes by sets, Singular cardinals, The consistency strength of choiceless failures of SCH, Some cardinal functions on algebras, Easton's theorem and large cardinals from the optimal hypothesis, Ehrenfeucht's lemma in set theory, A category-theoretic approach to Boolean-valued models of set theory, Some examples of precipitous ideals, The ground axiom, On the singular cardinals problem. I, Easton's theorem for the tree property below \(\aleph_\omega\), The internal consistency of Easton's theorem, Making the supercompactness of \(\nu\) indestructible under \(\nu\)-directed closed forcing, Internal consistency for embedding complexity, Towers in \([\omega^{\omega}\) and \(^{\omega}\omega\)], Shelah's pcf theory and its applications, MINIMUM MODELS OF SECOND-ORDER SET THEORIES, Long chains of Hausdorff topological group topologies, Local saturation and square everywhere, Generalized Iteration of Forcing, Hume's big brother: Counting concepts and the bad company objection, Large superuniversal metric spaces, The Structure of Dedekind Cardinals, Indexed squares, Some results on consecutive large cardinals, On universal graphs without instances of CH, The Significance of Relativistic Computation for the Philosophy of Mathematics, Consistency Results Concerning Supercompactness, Easton's theorem for Ramsey and strongly Ramsey cardinals, Cardinality bounds involving the skew-\(\lambda\) Lindelöf degree and its variants