On the boundary and intersection motives of genus 2 Hilbert-Siegel varieties

Abstract

We study genus 2 Hilbert-Siegel varieties, i.e. Shimura varieties SK corresponding to the group GSp4,F over a totally real field F, along with the relative Chow motives λ V of abelian type over SK obtained from irreducible representations Vλ of GSp4,F. We analyse the weight filtration on the degeneration of such motives at the boundary of the Baily-Borel compactification and we find a criterion on the highest weight λ which characterises the absence of the middle weights 0 and 1 in the corresponding degeneration. Thanks to Wildeshaus' theory, the absence of these weights allows us to construct Hecke-equivariant Chow motives over Q, whose realizations equal interior (or intersection) cohomology of SK with Vλ-coefficients. We give applications to the construction of motives associated to automorphic representations.