Normal zeta functions of the Heisenberg groups over number rings II -- the non-split case
Abstract
We compute explicitly the normal zeta functions of the Heisenberg groups H(R), where R is a compact discrete valuation ring of characteristic zero. These zeta functions occur as Euler factors of normal zeta functions of Heisenberg groups of the form H(OK), where OK is the ring of integers of an arbitrary number field~K, at the rational primes which are non-split in~K. We show that these local zeta functions satisfy functional equations upon the inversion of the prime.
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