Abstract
Let K be a non-archimedean local field and U a compact subgroup of GLn(K). Such U is a profinite group, actually it is virtually pro-p. If char(K) = 0, then U is finitely generated and even finitely presented as a profinite group. On the other hand if char(K) = p > 0, then U need not be finitely generated. Moreover, even if U is finitely generated, it may be non-finitely presented (see(1.3)). On the other hand;
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