Using the property of being completely Baire, countable dense homogeneity and
the perfect set property we will be able, under Martin's Axiom for countable
posets, to distinguish non-principal ultrafilters on $\omega$ up to
homeomorphism. Here, we identify ultrafilters with subpaces of $2^\omega$ in
the obvious way. Using the same methods, still under Martin's Axiom for
countable posets, we will construct a non-principal ultrafilter $\UU\subseteq
2^\omega$ such that $\UU^\omega$ is countable dense homogeneous. This
consistently answers a question of Hru\v{s}\'ak and Zamora Avil\'es. Finally,
we will give some partial results about the relation of such topological
properties with the combinatorial property of being a $\mathrm{P}$-point.