The tree property at first and double successors of singular cardinals with an arbitrary gap

Abstract

Let cof(μ)=μ and be a supercompact cardinal with μ<. Assume that there is an increasing and continuous sequence of cardinals <μ with 0:= and such that, for each <μ, +1 is supercompact. Besides, assume that λ is a weakly compact cardinal with <μ<λ. Let ≥λ be a cardinal with cof()>. Assuming the GCH≥, we construct a generic extension where is strong limit, cof()=μ, 2= and both TP(+) and TP(++) hold. Further, in this model there is a very good and a bad scale at . This generalizes the main results of [Sin16a] and [FHS18].