Crystalline condition for Ainf-cohomology and ramification bounds

Abstract

For a prime p>2 and a smooth proper p-adic formal scheme X over OK where K is a p-adic field, we study a series of conditions (Crs), s≥ 0 that partially control the GK-action on the image of the associated Breuil-Kisin prismatic cohomology R(X/S) inside the Ainf-prismatic cohomology R(XAinf/Ainf). The condition (Cr0) is a criterion for a Breuil-Kisin-Fargues GK-module to induce a crystalline representation used by Gee and Liu, and thus leads to a proof of crystallinity of Hi\'et(Xη, Qp) that avoids the crystalline comparison. The higher conditions (Crs) are used to adapt the strategy of Caruso and Liu in order to establish ramification bounds for the mod p representations Hi\'et(Xη, Z/pZ), for arbitrary e and i, which extend or improve existing bounds in various situations.