Exact bounds for even vanishing of K* (Z/pn)
Abstract
In this note, we prove that K2i (Z/pn) ≠ 0 if and only if p-1 divides i and 0 ≤ i ≤ (p-1) pn-2, refining the even vanishing theorem of Antieau, Nikolaus and the first author in this case. As a corollary of our proof, we determine that the nilpotence order of v1 in π* K(Z/pn)/p is equal to pn-1p-1. Our proof combines the recent crystallinity result for reduced syntomic cohomology of Hahn, Levy and the second author with the explicit complex computing the syntomic cohomology of OK /n constructed by Antieau, Nikolaus and the first author.
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