On unipotent radicals of motivic Galois groups

Abstract

Let T be a neutral Tannakian category over a field of characteristic zero with unit object 1, and equipped with a filtration W· similar to the weight filtration on mixed motives. Let M be an object of T, and u(M)⊂ W-1Hom(M,M) the Lie algebra of the kernel of the natural surjection from the fundamental group of M to the fundamental group of GrWM. A result of Deligne gives a characterization of u(M) in terms of the extensions 0 WpM M M/WpM 0: it states that u(M) is the smallest subobject of W-1Hom(M,M) such that the sum of the aforementioned extensions, considered as extensions of 1 by W-1Hom(M,M), is the pushforward of an extension of 1 by u(M). In this article, we study each of the above-mentioned extensions individually in relation to u(M). Among other things, we obtain a refinement of Deligne's result, where we give a sufficient condition for when an individual extension 0 WpM M M/WpM 0 is the pushforward of an extension of 1 by u(M). In the second half of the paper, we give an application to mixed motives whose unipotent radical of the motivic Galois group is as large as possible (i.e. with u(M)= W-1Hom(M,M)). Using Grothedieck's formalism of extensions panach\'ees we prove a classification result for such motives. Specializing to the category of mixed Tate motives we obtain a classification result for 3-dimensional mixed Tate motives over Q with three weights and large unipotent radicals.