\'Etale geometry of closures of Jordan classes
Abstract
Let G be a connected reductive algebraic group with simply connected derived subgroup. Over the complex numbers there exists a local method to study the geometric properties of a point g in the closure of a Jordan class of G in terms of Jordan classes of a maximal rank reductive subgroup M ≤ G depending on the point g, and further to the closures of certain decomposition classes in Lie(M). We adapt this method to the case of an algebraically closed field of characteristic p, and we give sufficient restrictions on p for it to hold.
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