On the Hodge conjecture and the Tate conjecture for the Hilbert schemes of an abelian surface

## Abstract We clarify the expected properties of the slice filtration on triangulated motives from the point of view of the generalized Hodge conjecture. In the appendix, J. Ayoub proves unconditionally that the slice filtration does not respect geometric motives. (© 2008 WILEY‐VCH Verlag GmbH & C

## dedicated to meeyoung's parents We compute the Chow motive and the Chow groups with rational coefficients of the Hilbert scheme of points on a smooth algebraic surface.  2002 Elsevier Science (USA)

The Fontaine Mazur Conjecture for number fields predicts that infinite l-adic analytic groups cannot occur as the Galois groups of unramified l-extensions of number fields. We investigate the analogous question for function fields of one variable over finite fields, and then prove some special cases

## Abstract Let __G__ be a simple graph of order __n__ with Laplacian spectrum {λ~__n__~, λ~__n__−1~, …, λ~1~} where 0=λ~__n__~≤λ~__n__−1~≤⋅≤λ~1~. If there exists a graph whose Laplacian spectrum is __S__={0, 1, …, __n__−1}, then we say that __S__ is Laplacian realizable. In 6, Fallat et al. posed

## ON A NECESSARY CONDITION FOR THE VALIDITY OF GOLDBACH'S CONJECTURE1) by ALBERT A. MULLIN 111 Urbana, ulinois (USA) The aut. or dedicates ths paper to tr&e memory of ALAN MATEISON TURING on the occasion of the 50th anniversary of that mathem itician's birthday, 23 June 1912.