A Lower Bound for Generalized Dominating Numbers

Abstract

We show a new proof for the fact that when and λ are infinite cardinals satisfying λ = λ, the cofinality of the set of all functions from λ to ordered by everywhere domination is 2λ. An earlier proof was a consequence of a result about independent families of functions. The new proof follows directly from the main theorem we present: for every A ⊂eq λ there is a function f: λ such that whenever M is a transitive model of ZF such that λ ⊂eq M and some g: λ in M dominates f, then A ∈ M. That is, "constructibility can be reduced to domination".