On Integral Class field theory for varieties over p-adic fields
Abstract
Let K be a finite extension of the p-adic numbers Qp with ring of integers OK, X a regular scheme, proper, flat, and geometrically irreducible over OK of dimension d, and XK its generic fiber. We show, under some assumptions on XK, that there is a reciprocity isomorphism of locally compact groups Har2d-1( XK, Z(d)) π1ab( XK)W from a new cohomology theory to an integral model π1ab( XK)W of the abelianized geometric fundamental groups π1ab( XK)geo. After removing the contribution from the base field, the map becomes an isomorphism of finitely generated abelian groups.
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