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Twists of symmetric bundles | Ph. Cassou-Nogues
; B. Erez
; M.J. Taylor
; | Date: |
11 Apr 2004 | Subject: | Algebraic Geometry; Number Theory MSC-class: 11E70; 14E20 | math.AG math.NT | Abstract: | We establish comparison results between the Hasse-Witt invariants w_t(E) of a symmetric bundle E over a scheme and the invariants of one of its twists E_{alpha}. For general twists we describe the difference between w_t(E) and w_t(E_{alpha}) up to terms of degree 3. Next we consider a special kind of twist, which has been studied by A. Fröhlich. This arises from twisting by a cocycle obtained from an orthogonal representation. We show how to explicitly describe the twist for representations arising from very general tame actions. This involves the ``square root of the inverse different’’ which Serre, Esnault, Kahn, Viehweg and ourselves had studied before. For torsors we show that, in our geometric set-up, Jardine’s generalization of Frohlich’s formula holds. The case of genuinely tamely ramified actions is geometrically more involved and leads us to introduce a ramification invariant which generalises in higher dimension the invariant introduced by Serre for curves. | Source: | arXiv, math.AG/0404219 | Services: | Forum | Review | PDF | Favorites |
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