Algebraic cycles and Tate classes on Hilbert modular varieties

Abstract

Let E/Q be a totally real number field that is Galois over Q, and let π be a cuspidal, nondihedral automorphic representation of GL2(AE) that is in the lowest weight discrete series at every real place of E. The representation π cuts out a "motive" Met(π∞) from the -adic middle degree intersection cohomology of an appropriate Hilbert modular variety. If is sufficiently large in a sense that depends on π we compute the dimension of the space of Tate classes in Met(π∞). Moreover if the space of Tate classes on this motive over all finite abelian extensions k/E is at most of rank one as a Hecke module, we prove that the space of Tate classes in Met(π∞) is spanned by algebraic cycles.