Hodge--Tate crystals on the logarithmic prismatic sites of semi-stable formal schemes

Abstract

Let K be a complete discrete valuation ring of mixed characteristic (0,p) with a perfect residue field. In this paper, for a semi-stable p-adic formal scheme over K with rigid generic fibre X and canonical log structure = _X×, we study Hodge--Tate crystals over the absolute logarithmic prismatic site (,). As an application, we give an equivalence between the category of rational Hodge--Tate crystals on the absolute logarithmic prismatic site (,) and the category of enhanced log Higgs bundles over , which leads to an inverse Simpson functor from the latter to the category of generalised representations on X.

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