Standard Hausdorff spectrum of compact Fp[[t]]-analytic groups

Abstract

We prove that the Fp[[t]]-standard Hausdorff spectrum of a compact Fp[[t]]-analytic group contains a real interval and that it coincides with the full unit interval when the group is soluble. Moreover, we show that the Fp[[t]]-standard Hausdorff spectrum of classical Chevalley groups over Fp[[t]] is not full, since 1 is an isolated point thereof.