Matrix generators for the unit groups of LK(1,d)
Abstract
Let K be a field and put Ld=LK(Rd) LK(1,d). Ordered leaf sets in the rooted d-ary tree determine copies of general linear groups over K inside Ld×. We prove that these copies generate Ld× for every d≥2. In the binary case, L2×= 1+eaf*,1+fbe*:a,b∈ L2. We characterize finite generation of Ld×, determine the subgroup represented by monomial matrices, and embed ∞(K) in L2×. Over a finite field, finite presentability of Ld× is equivalent to finite generation of the unstable K2-group K2(n,Ld) for every n=1+r(d-1)≥5, where r≥0; we also compute K2(Ld).
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