Non-Surjectivity of the Universal Torsor Evaluation Map for Homogeneous Spaces

Abstract

Let K be a field of characteristic zero, let G be a connected linear K-algebraic group, and let H be a connected closed subgroup of G. Let Xc be a smooth compactification of X=G/H, and let YXc be the universal S-torsor with trivial fibre over the class of the identity of G. Colliot-Th\'el\`ene and Kunyavski have shown that S is a flasque torus, and that the evaluation map Xc(K)→ H1(K,S), induced by the universal torsor, is surjective when the field K is 'good'; and the same is true when we restrict the evaluation map to the K-points of X. In this article, we establish that in cases where the field is not 'good', surjectivity may fail when the domain is X(K). We provide two concrete examples: one over a field of cohomological dimension 2 and the other over an arithmetic field, such as Q7((t)).

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