Forcing a Basis into 1-Free Groups

Abstract

In this paper, we address the question of when a non-free 1-free group H can be be free in a transitive cardinality-preserving model extension. Using the -invariant, denoted (H), we present a necessary and sufficient condition resolving this question for 1-free groups of cardinality 1. Specifically, if (H) = [1], then H will be free in a transitive model extension if and only if 1 collapses, while for (H) [1] there exist cardinality-preserving forcings that will add a basis to H. In particular, for (H) ≠ [1], we provide a poset ( P pb, ≤) of partial bases for adding a basis to H without collapsing 1.