Toric decomposition in algebraic groups
Abstract
Over an arbitrary field F, we construct n+1 maximal tori T1,…,Tn+1 in PGLn(F) so that the product T1… Tn+1 is almost the whole PGLn(F) and every g∈ T1… Tn+1 can be expressed uniquely as g=t1… tn+1 where ti∈ Ti. The construction is optimal, as the number of tori with this property attains a general upper bound for connected reductive groups over an algebraically closed field, as well as over finite fields. We also show that n+2 suitably chosen maximal tori T1,…,Tn+2 are enough to cover the whole group, i.e. PGLn(F)=T1… Tn+2, provided |F|>n2. This is optimal over a finite field and is conjecturally optimal over algebraically closed fields, i.e. the number of such tori is as small as possible.
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