The elementary obstruction and homogeneous spaces

Abstract

Let k be a field of characteristic zero and k an algebraic closure of k. For a geometrically integral variety X over k, we write k(X) for the function field of X=X×k k. If X has a smooth k-point, the natural embedding of multiplicative groups k* k(X)* admits a Galois-equivariant retraction. In the first part of the paper, over local and then over global fields, equivalent conditions to the existence of such a retraction are given. They are expressed in terms of the Brauer group of X. In the second part of the paper, we restrict attention to varieties which are homogeneous spaces of connected but otherwise arbitrary algebraic groups, with connected geometric stabilizers. For k local or global, for such a variety X, in many situations but not all, the existence of a Galois-equivariant retraction to k* k(X)* ensures the existence of a k-rational point on X. For homogeneous spaces of linear algebraic groups, the technique also handles the case where k is the function field of a complex surface.

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