Borel Complexity and the Schr\"oder-Bernstein Property

Abstract

We introduce a new invariant of Borel reducibility, namely the notion of thickness; this associates to every sentence of Lω1 ω and to every cardinal λ, the thickness τ(, λ) of at λ. As applications, we show that all the Friedman-Stanley jumps of torsion abelian groups are non-Borel complete. We also show that under the existence of large cardinals, if is a sentence of Lω1 ω with the Schr\"oder-Bernstein property (that is, whenever two countable models of are biembeddable, then they are isomorphic), then is not Borel complete.