Transcendency of the determinant of the Riemann operator: on higher K-groups

Abstract

In previous papers we investigated basic properties of the determinant GK(s) of the Riemann operator: R acting on n>1 Kn(A)C, where A is the integer ring of an algebraic number field K. The function GK(s) is defined as the regularized determinant \[ GK(s) = det ((s I-R) | n>1 Kn(A)C ) \] with R | Kn(A)C = 1-n2. We showed that GK(s)-1 is essentially the so called gamma factors of Dedekind zeta function of K. In this paper we study the transcendency of GK(s) for some rational numbers s. The result depends on types of K. For example, we show that GK(13) is a transcendental number if K is a totally imaginary and GK(12) is a transcendental number otherwise.