Embeddings of groups Aut(Fn) into automorphism groups of algebraic varieties

Abstract

For every positive integer n, we construct, using algebraic groups, an infinite family of irreducible algebraic varieties X,whose automorphism group Aut(X) contains the automorphism group Aut(Fn) of a free group Fn of rank n as a subgroup. This property implies that, for n ≥slant 2, such groups Aut(X) are nonamenable, and, for n ≥slant 3, nonlinear and contain the braid group Bn on n strands. Some of these varieties X are affine, and among affine, some are rational and some are not, some are smooth and some are singular. As an application, we deduce that, for n ≥slant 3 , every Cremona group of rank ≥slant 3n contains the groups Aut(Fn) and Bn as the subgroups. This bound is better than the one that follows from the paper by D. Krammer [14], where the linearity of the braid group Bn is proved.

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