On behavior of conductors, Picard schemes, and Jacobian numbers of varieties over imperfect fields

Abstract

Let X be a regular geometrically integral variety over an imperfect field K. Unlike the case of characteristic 0, X':=X×Spec\,KSpec\,K' may have singular points for a (necessarily inseparable) field extension K'/K. In this paper, we define new invariants of the local rings of codimension 1 points of X', and use these invariants for the calculation of δ-invariants (, which relate to genus changes,) and conductors of such points. As a corollary, we give refinements of Tate's genus change theorem and the Patakfalvi-Waldron Theorem. Moreover, when X is a curve, we show that the Jacobian number of X is 2p/(p-1) times of the genus change by using the above calculation. In this case, we also relate the structure of the Picard scheme of X with invariants of singular points of X. To prove such a relation, we give a characterization of the geometrical normality of algebras over fields of positive characteristic.

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