论文信息 - Rost projectors and Steenrod operations

Rost projectors and Steenrod operations

Let X be an anisotropic projective quadric possessing a Rost projector ‰. We compute the 0-dimensional component of the total Steenrod operation on the modulo 2 Chow group of the Rost motive given by the projector‰. The computation allows to determine the whole Chow group of the Rost motive and the Chow group of every excellent quadric (the results announced by Rost). On the other hand, the computation is being applied to give a simpler proof of Vishik's theorem stating that the integer dimX + 1 is a power of 2.

Nikita A. Karpenko | Alexander Merkurjev | A. Merkurjev | N. Karpenko

[1] I. Panin. Riemann-Roch theorem for oriented cohomology , 2002 .

[2] Manfred Knebusch. Generic Splitting of Quadratic Forms, I , 1976 .

[3] M. Rost. Some new results on the Chowgroups of quadrics , 2001 .

[4] J. B. Ferguson,et al. Motives , 1983 .

[5] Ivan Panin,et al. Index Reduction Formulas for Twisted Flag Varieties, II , 1996 .

[6] P. Brosnan. Steenrod operations in chow theory , 2003 .

[7] R. G. Swan. Zero cycles on quadric hypersurfaces , 1989 .

[8] A. Vishik. On the dimension of anisotropic forms , 2000 .

[9] N. Karpenko. Characterization of minimal Pfister neighbors via Rost projectors , 2001 .