M. Rovinsky
Published 2001-01-20, updated 2004-05-03Version 9
Let k be an algebraically closed field of characteristic zero, F its algebraically closed extension, and G be the group of k-automorphisms of F endowed with a natural topology. One of the purposes of this paper is to show that any non-faithful continuous representation of G factors through a discrete quotient of G. Properties of representation of G arising from geometry are studied. In some cases the groups of morphisms between geometric objects are identified with the groups of morphisms between corresponding G-modules, and the ${\rm Ext}^1$'s are related. In particular, the category of abelian varieties over k with morphisms tensored with the rationals can be described as a category of G-modules.
Journal: Math. Zeitschrift 249 (2005), no.1, 163--221
Unitary $L^{p+}$-representations of almost automorphism groups
Decomposition numbers for Brauer algebras of type G(m,p,n) in characteristic zero
Representations of automorphism groups on the homology of matroids
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