Characterizations of the weakly compact ideal on Pλ

Abstract

Hellsten MR2026390 gave a characterization of 1n-indescribable subsets of a 1n-indescribable cardinal in terms of a natural filter base: when is a 1n-indescribable cardinal, a set S⊂eq is 1n-indescribable if and only if S C≠ for every n-club C⊂eq . We generalize Hellsten's characterization to 1n-indescribable subsets of Pλ, which were first defined by Baumgartner. After showing that under reasonable assumptions the 10-indescribability ideal on Pλ equals the minimal strongly normal ideal NSS,λ on Pλ, and is not equal to NS,λ as may be expected, we formulate a notion of n-club subset of Pλ and prove that a set S⊂eq Pλ is 1n-indescribable if and only if S C≠ for every n-club C⊂eq Pλ. We also prove that elementary embeddings considered by Schanker MR2989393 witnessing near supercompactness lead to the definition of a normal ideal on Pλ, and indeed, this ideal is equal to Baumgartner's ideal of non--11-indescribable subsets of Pλ. Additionally, as applications of these results we answer a question of Cox-L\"ucke MR3620068 about F-layered posets, provide a characterization of mn-indescribable subsets of Pλ in terms of generic elementary embeddings, prove several results involving a two-cardinal weakly compact diamond principle and observe that a result of Pereira MR3640048 yeilds the consistency of the existence of a (,+)-semimorasses μ⊂eq P+ which is 1n-indescribable for all n<ω.