Determinants of Riemann operators on Quillen's higher K-groups: periodicity

Abstract

In a previous paper [KT] we introduced determinant of the Riemann operator on Quillen's higher K-groups of the integer ring of an algebraic number field K. We showed that the determinant expresses essentially the inverse of the so called gamma factor of Dedekind zeta function of K. Here we study the periodicity of determinant. This comes from the famous "periodicity" of higher K groups. This periodicity is analogous to Euler's periodicity of gamma function (x+1)=x(x). We investigate the "reflection formula" corresponding to Euler's reflection formula (x)(1-x)=π(π x) also.