Minimality of topological matrix groups and Fermat primes

Abstract

Our aim is to study topological minimality of some natural matrix groups. We show that the special upper triangular group SUT(n,F) is minimal for every local field F of characteristic ≠ 2. This result is new even for the field R of reals and it leads to some important consequences. We prove criteria for the minimality and total minimality of the special linear group SL(n,F), where F is a subfield of a local field. This extends some known results of Remus-Stoyanov (1991) and Bader-Gelander (2017). One of our main applications is a characterization of Fermat primes, which asserts that for an odd prime p the following conditions are equivalent: p is a Fermat prime; SL(p-1,Q) is minimal, where Q is the field of rationals equipped with the p-adic topology; SL(p-1,Q(i)) is minimal, where Q(i) ⊂ C is the Gaussian rational field.