Quasi-inner functions and local factors

Abstract

We introduce the notion of quasi-inner function and show that the product u=∞Π v of m+1 ratios of local L-factors v(z)=γv(z)/γv(1-z) over a finite set F of places of the field of rational numbers inclusive of the archimedean place is quasi-inner on the left of the critical line (z)= 12 in the following sense. The off diagonal part u21 of the matrix of the multiplication by u in the orthogonal decomposition of the Hilbert space L2 of square integrable functions on the critical line into the Hardy space H2 and its orthogonal complement is a compact operator. When interpreted on the unit disk, the quasi-inner condition means that the associated Haenkel matrix is compact. We show that none of the individual non-archimedean ratios v is quasi-inner and, in order to prove our main result we use Gauss multiplication theorem to factor the archimedean ratio ∞ into a product of m quasi-inner functions whose product with each v retains the property to be quasi-inner. Finally we prove that Sonin's space is simply the kernel of the diagonal part u22 for the quasi-inner function u=∞, and when u(F)=Πv∈ F v the kernels of the u(F)22 form an inductive system of infinite dimensional spaces which are the semi-local analogues of (classical) Sonin's spaces.