Hasse invariants for Hilbert modular varieties

Let F be a totally real number field with ring of integers O, and let Γ = SL(2, O) be the Hilbert modular group. Given the orthonormal basis of Hecke eigenforms in S 2k (Γ ), one can associate a probability measure dμ k on the Hilbert modular variety Γ \H n . We prove that dμ k tends to the invarian

Classical specification and verification techniques support invariants for individual objects whose fields are primitive values, but do not allow sound modular reasoning about invariants involving more complex object structures. Such non-trivial object structures are common, and occur in lists, hash

We show the existence of the Chow-Künneth projectors for certain varieties, including Kuga-Shimura varieties of Hilbert modular varieties. The Chow-Künneth projectors of a smooth projective variety are, by definition, mutually orthogonal idempotents of the Chow ring of self-correspondences which giv