Vanishing of Witten zeta function at negative integers
Abstract
We introduce a new analytic method for studying Witten zeta function of a root system Φ, based on a refined manipulation of an integral representation involving the Hurwitz zeta function. As an application, we prove high-order vanishing at negative even integers. This technique also describes non-trivially, the arithmetic nature of the leading term, in which the highest root of Φ makes a surprising appearance.
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