Ramification bounds via Wach modules and q-crystalline cohomology
Abstract
Let K be an absolutely unramified p-adic field. We establish a ramification bound, depending only on the given prime p and an integer i, for mod p Galois representations associated with Wach modules of height at most i. Using an instance of q-crystalline cohomology (in its prismatic form), we thus obtain improved bounds on the ramification of Hiet(XCK, Z/pZ) for a smooth proper p-adic formal scheme X over OK, for arbitrarily large degree i.
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