Finiteness of logarithmic crystalline representations

Abstract

Let K be an unramified p-adic local field and let W be the ring of integers of K. Let (X,S)/W be a smooth proper scheme together with a normal crossings divisor. We show that there are only finitely many log crystalline Zpf-local systems over XK SK of given rank and with geometrically absolutely irreducible residual representation, up to twisting by a character. The proof uses p-adic nonabelian Hodge theory and a finiteness result due Abe/Lafforgue.