Crystalline representations and p-adic Hodge theory for non-commutative algebraic varieties

Abstract

Let T be an OK-linear idempotent-complete, small smooth proper stable ∞-category, where K is a finite extension of Qp. We give a Breuil-Kisin module structure on the topological negative cyclic homology πi TC-(T/S[z];Zp), and prove a K-theory version of Bhatt-Morrow-Scholze's comparison theorems. Moreover, using Gao's Breuil-Kisin GK-module theory and Du-Liu's (,G)-module theory, we prove the Zp[GK]-module TA inf(πi TC-(T/S[z];Zp)) is a Zp-lattice of a crystalline representation. As a corollary, if the generic fibre of T admits a geometric realization in the sense of Orlov, we prove a comparison theorem between K(1)-local K theory of the generic fibre and topological cyclic periodic homology theory of the special fibre with B crys-coefficients, in particular, we prove the p-adic representation of the K(1)-local K-theory of the generic fibre is a crystalline representation, this can be regarded as a non-commutative analogue of p-adic Hodge theory for smooth proper varieties proved by Tsuji and Faltings. This is the full version of arXiv:2305.00292, containing additional details and results.