Functoriality of motivic lifts of the canonical construction

Abstract

Let (G,X) be a Shimura datum and K a neat open compact subgroup of G(Af). Under mild hypothesis on (G,X), the canonical construction associates a variation of Hodge structure on ShK(G,X)(C) to a representation of G. It is conjectured that this should be of motivic origin. Specifically, there should be a lift of the canonical construction which takes values in relative Chow motives over ShK(G,X) and is functorial in (G,X). Using the formalism of mixed Shimura varieties, we show that such a motivic lift exists on the full subcategory of representations of Hodge type (-1,0),(0,-1). If (G,X) is equipped with a choice of PEL-datum, Ancona has defined a motivic lift for all representations of G. We show that this is independent of the choice of PEL-datum and give criteria for it to be compatible with base change.