Relative Hecke's integral formula for an arbitrary extension of number fields
Abstract
In this article, we present a generalized Hecke's integral formula for an arbitrary extension E/F of number fields. As an application, we present relative versions of the residue formula and Kronecker's limit formula for the "relative" partial zeta function of E/F. This gives a simultaneous generalization of two different known results given by Hecke himself and Yamamoto.
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