The relatively universal cover of the natural embedding of the long root geometry for the group SL(n+1,K)

Abstract

The long root geometry An,\1,n\(K) for the special linear group SL(n+1,K) admits an embedding in the (projective space of) the vector space of the traceless square matrices of order n+1 with entries in the field K, usually regarded as the natural embedding of An,\1,n\(K). S. Smith and H. V\"olklein (A geometric presentation for the adjoint module of SL3(K), J. Algebra, vol. 127) have proved that the natural embedding of A2,\1,2\(K) is relatively universal if and only if K is either algebraic over its minimal subfield or perfect with positive characteristic. They also give some information on the relatively universal embedding of A2,\1,2\(K) which covers the natural one, but that information is not sufficient to exhaustively describe it. The "if" part of Smith-V\"olklein's result also holds true for any n, as proved by V\"olklein in his investigation of the adjoint modules of Chevalley groups (H. V\"olklein, On the geometry of the adjoint representation of a Chevalley group, J. Algebra, vol. 127). In this paper we give an explicit description of the relatively universal embedding of An,\1,n\(K) which covers the natural one. In particular, we prove that this relatively universal embedding has (vector) dimension equal to d+n2+2n where d is the transcendence degree of K over its minimal subfield (if char(K) = 0) or the generating rank of K over Kp (if char(K) = p > 0). Accordingly, both the "if" and the "only if" part of Smith-V\"olklein's result hold true for every n ≥ 2.

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