The pro-p group of upper unitriangular matrices

We study the pro-$p$ group $G$ whose finite quotients give the prototypical Sylow $p$-subgroup of the general linear groups over a finite field of prime characteristic $p$. In this article, we extend the known results on the subgroup structure of $G$. In particular, we give an explicit embedding of the Nottingham group as a subgroup and show that it is selfnormalising. Holubowski (\cite{holub1,holub0,holub2}) studies a free product $C_p*C_p$ as a (discrete) subgroup of $G$ and we prove that its closure is selfnormalising of infinite index in the subgroup of $2$-periodic elements of $G$. We also discuss change of rings: field extensions and a variant for the $p$-adic integers, this latter linking $G$ with some well known $p$-adic analytic groups. Finally, we calculate the Hausdorff dimensions of some closed subgroups of $G$ and show that the Hausdorff spectrum of $G$ is the whole interval $[0,1]$ which is obtained by considering partition subgroups only.