Zero-cycles on a twisted Cayley plane

Abstract

This is an essentially extended version of the preprint dated by August 2005 (this includes now the varieties of types F4, E6 and E7). Let k be a field of characteristic not 2 and 3. Let G be an exceptional simple algebraic group of type F4, inner type E6 or E7 with trivial Tits algebras. Let X be a projective G-homogeneous variety. If G is of type E7 we assume in addition that the respective parabolic subgroup is of type P7. The main result of the paper says that the degree map on the group of zero cycles of X is injective.

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