A Conjecture of Bhatt--Lurie and weakly p-nilpotent Hodge--Tate stacks
Abstract
Let k be a perfect field of characteristic p, and let X/k be a smooth variety. It is known that given a Frobenius lifting of X, we can identify prismatic crystals and nilpotent Higgs bundles, known as a positive characteristic version of the Simpson correspondence of X. However, Ogus--Vologodsky point out in their original paper of non-abelian Hodge theory in characteristic p that, if we are just given a smooth lifting over 2(k), there is a non-abelian Hodge theory on p-nilpotent Higgs bundles. Hence, it is natural to ask that whether there exists a subcategory of Hodge--Tate crystals on X, which can be described as p-nilpotent Higgs bundles. In this paper, we construct an analogue of the Hodge--Tate stack, so called the weakly p-nilpotent Hodge--Tate stack, on which the vector bundles are identified with certain Hodge--Tate crystals on X that can be locally described by weakly p-nilpotent Higgs bundles. Furthermore, we prove that the weakly p-nilpotent Hodge--Tate stack is indeed a gerbe banded by TX/kαp, and the obstruction class coincides with the obstruction of the existence of a Frobenius lifting of X, which is a conjecture of Bhatt and Lurie.
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