Geometric monodromy -- semisimplicity and maximality

Abstract

Let X be a connected scheme, smooth and separated over an algebraically closed field k of characteristic p≥ 0, let f:Y→ X be a smooth proper morphism and x a geometric point on X. We prove that the tensor invariants of bounded length ≤ d of π1(X,x) acting on the \'etale cohomology groups H*(Yx,F) are the reduction modulo- of those of π1(X,x) acting on H*(Yx,Z) for greater than a constant depending only on f:Y→ X, d. We apply this result to show that the geometric variant with F-coefficients of the Grothendieck-Serre semisimplicity conjecture -- namely that π1(X,x) acts semisimply on H*(Yx,F) for 0 -- is equivalent to the condition that the image of π1(X,x) acting on H*(Yx,Q) is `almost maximal' (in a precise sense; what we call `almost hyperspecial') with respect to the group of Q-points of its Zariski closure. Ultimately, we prove the geometric variant with F-coefficients of the Grothendieck-Serre semisimplicity conjecture.