Abstract In this article, we prove a semi-continuity property for both conductor divisors and logarithmic conductor divisors for étale sheaves on higher relative dimensions in a geometric situation. It generalizes a semi-continuity result for conductors of étale sheaves on relative curves to higher relative dimensions, and it can be considered as a higher dimensional -adic analogy of André’s result on the semi-continuity of Poincaré–Katz ranks of meromorphic connections on smooth relative curves.
Hu et al. (Sat,) studied this question.
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