The aim of this paper is to show that every infinite Boolean algebra which admits a countable minimally acting group contains a dense projective subalgebra.

 For a cardinal μ we give a sufficient condition ${\oplus }_{\mu }$ (involving ranks measuring existence of independent sets) for: ${\otimes }_{\mu }$ if a Borel set B ⊆ ℝ × ℝ contains a μ-square (i.e. a set of the form A × A with |A| =μ) then it contains a $2^{{\aleph }_0}$-square and even a perfect square, and also for ${\otimes }_{\mu }^{\text{'}}$ if $\psi \in L_{{\omega }_1,\omega }$ has a model of cardinality μ then it has a model of cardinality continuum generated in a “nice”, “absolute” way. Assuming $MA+2^{{\aleph }_0}>\mu$ for transparency, those three conditions (${\oplus }_{\mu }$, ${\otimes }_{\mu }$ and ${\otimes }_{\mu }^{\text{'}}$) are equivalent, and from this we deduce that...