Automorphisms of symmetric powers and motivic zeta functions
Abstract
We prove that if X is a smooth projective variety of dimension greater than 1 over a field K of characteristic zero such that Pic(XK) = Z and XK is simply connected, then the natural map : Aut(X) Aut(Symd(X)) is an isomorphism for every d > 0. We also partially compute the motivic zeta function of a Severi-Brauer surface and explain some relations between the classes of Severi-Brauer varieties in the Grothendieck ring of varieties.
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