A-upper motives of reductive groups

Abstract

Given a prime number p, we perform the study of Chow motives and motivic decompositions, with coefficients in Z/pZ, of projective homogeneous varieties for p'-inner p-consistent reductive algebraic groups. Assorted with the known case of p-inner reductive groups, our results cover all absolutely simple groups of type not 3\!D4 or 6\!D4, among other examples. First, we define the A-upper motives of such a reductive group G; they are indecomposable motives, naturally related to Artin motives built out of spectra of subextensions of a minimal extension over which G become of inner type. With this in hand, we carry on the qualitative study of motivic decompositions for projective G-homogeneous varieties. Providing geometric isomorphism criteria for A-upper motives, we obtain a classification of motives of projective G-homogeneous varieties, by means of their higher Artin-Tate traces. We also show that the higher Tits p-indexes of the group G determine its motivic equivalence class.