Zeros of the Goss zeta function

Abstract

Let X be a smooth proper curve over a finite field and let ∞ ∈ X be a closed point. Let A be the ring of functions on X - ∞. The Goss zeta function ζA of A is an equicharacteristic analogue of the Riemann zeta function. In this article we study the zeros of ζA under the generic condition that X is ordinary. We prove an analogue of the Riemann hypothesis, which verifies a corrected version of a conjecture of Goss. We also show that the zeros of ζA at negative even integers are `simple' and that ζA is nonzero at negative odd integers. This answers questions posed by Goss and Thakur. Both of these results were previously only known under the restrictive hypothesis that A has class number one. Finally, we prove versions of these results for v-adic interpolations of the Goss zeta function.

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