On ( 1,ω1) -weakly universal functions

Abstract

A function U:[ ω1] 2ω is called ( 1,ω1) -weakly universal if for every function F:[ ω1] 2ω there is an injective function h:ω1ω1 and a function e:ω ω such that F( α,β) =e( U( h( α) ,h( β) ) ) for every α,β∈ω1. We will prove that it is consistent that there are no ( 1,ω1) -weakly universal functions, this answers a question of Shelah and Stepr\=ans. In fact, we will prove that there are no ( 1,ω1) -weakly universal functions in the Cohen model and after adding ω2 Sacks reals side-by-side. However, we show that there are ( 1,ω 1) -weakly universal functions in the Sacks model. In particular, the existence of such graphs is consistent with and the negation of the Continuum Hypothesis.