Troisi\`eme groupe de cohomologie non ramifi\'ee des torseurs universels sur les surfaces rationnelles

Abstract

Let k a field of characteristic zero. Let X be a smooth, projective, geometrically rational k-surface. Let T be a universal torsor over X with a k-point et Tc a smooth compactification of T. There is an open question: is Tc k-birationally equivalent to a projective space? We know that the unramified cohomology groups of degree 1 and 2 of T and Tc are reduced to their constant part. For the analogue of the third cohomology groups, we give a sufficient condition using the Galois structure of the geometrical Picard group of X. This enables us to show that H3nr(Tc,Q/Z(2))/H3(k,Q/Z(2)) vanishes if X is a generalised Ch\atelet surface and that this group is reduced to its 2-primary part if X is a del Pezzo surface of degree at least 2.