Conjectures on L-functions for flag bundles on Dedekind domains

Abstract

Let OK be the ring of integers in an algebraic number field K and let S:=Spec(OK). Let T0,…,Tn be regular schemes of finite type over S and let X be a scheme of finite type over Tn with a stratification of closed subschemes (a generalized cellular decomposition) \[ =X-1 ⊂eq X0 ⊂eq ·s ⊂eq Xn-1 ⊂eq Xn:=X \] with Xi-Xi-1=Ei where Ei is a vector bundle of rank di on Ti. We prove that if the Beilinson-Soule vanishing conjecture and Soule conjecture holds for Ti it follows the same conjectures hold for X. We develop a criteria for the conjectures to hold in terms of an open cover and use this criteria to prove the Beilinson-Soule vanishing conjecture and Soule conjecture for the partial flag bundle F(d,E) of any coherent OS-module E on S. Hence we get non-trivial examples where the conjectures hold in arbitrary dimension. As a special case we prove the conjectures for any affine or projective fibration of finite type over S. We moreover reduce the study of the Beilinson-Soule vanishing conjecture and the Soule conjecture on L-functions to the study of affine regular schemes of finite type over Z. We also discuss the Beilinson conjecture on special values for partial flag bundles. We reduce the study of the Bloch-Kato conjecture on special values for flag bundles to the case of Dedekind domains.