Moduli of -adic pro-\'etale local systems for smooth non-proper schemes

Abstract

Let X be a smooth scheme over an algebraically closed field. When X is proper, it was proved in me1 that the moduli of -adic continuous representations of π1(X), (X), is representable by a (derived) -analytic space. However, in the non-proper case one cannot expect that the results of me1 hold mutatis mutandis. Instead, assuming is invertible in X, one has to bound the ramification at infinity of those considered continuous representations. The main goal of the current text is to give a proof of such representability statements in the open case. We also extend the representability results of me1. More specifically, assuming X is assumed to be proper, we show that (X) admits a canonical shifted symplectic form and we give some applications of such existence result.