Generic Coding with Help and Amalgamation Failure

Abstract

We show that if M is a countable transitive model of ZF and if a,b are reals not in M, then there is a G generic over M such that b ∈ L[a,G]. We then present several applications such as the following: if J is any countable transitive model of ZFC and M ⊂eq J is another countable transitive model of ZFC of the same ordinal height α, then there is a forcing extension N of J such that M N is not included in any transitive model of ZFC of height α. Also, assuming 0\# exists, letting S be the set of reals generic over L, although S is disjoint from the Turing cone above 0\#, we have that for any non-constructible real a, \ a s : s ∈ S \ is cofinal in the Turing degrees.