Evaluating the tame Brauer group of open varieties over local fields
Abstract
In this document we let U be a smooth variety of pure dimension d over a local field kv with unit ball Ov and residue field F of characteristic p>0 and we set n to be a positive integer such that p n. For various u∈ U(kv) we study the evaluation map u*:H2(U,μn) H2(kv,μn). We suppose that U embeds as an open subscheme in a regular scheme X that is of finite type over Ov. We assume that Z:=X U is a divisor and we endow it with its reduced scheme structure. We show that for u1,u2∈ U(kv) that lift to x1,x2∈ X(Ov) we obtain the same evaluation map u1*=u2* under the two conditions that first, there is an equality of reductions x1=x2 in X(F) and second, that cl(x1 Z)=cl(x2 Z) holds in H2d|x|(Z,μn d).
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