English

Geometric monodromy -- semisimplicity and maximality

Number Theory 2017-02-24 v1 Algebraic Geometry Representation Theory

Abstract

Let XX be a connected scheme, smooth and separated over an algebraically closed field kk of characteristic p0p\geq 0, let f:YXf:Y\rightarrow X be a smooth proper morphism and xx a geometric point on XX. We prove that the tensor invariants of bounded length d\leq d of π1(X,x)\pi_1(X,x) acting on the \'etale cohomology groups H(Yx,F)H^*(Y_x,F_\ell) are the reduction modulo-\ell of those of π1(X,x)\pi_1(X,x) acting on H(Yx,Z)H^*(Y_x,Z_\ell) for \ell greater than a constant depending only on f:YXf:Y\rightarrow X, dd. We apply this result to show that the geometric variant with FF_\ell-coefficients of the Grothendieck-Serre semisimplicity conjecture -- namely that π1(X,x)\pi_1(X,x) acts semisimply on H(Yx,F)H^*(Y_x,F_\ell) for 0\ell\gg 0 -- is equivalent to the condition that the image of π1(X,x)\pi_1(X,x) acting on H(Yx,Q)H^*(Y_x,Q_\ell) is `almost maximal' (in a precise sense; what we call `almost hyperspecial') with respect to the group of QQ_\ell-points of its Zariski closure. Ultimately, we prove the geometric variant with FF_\ell-coefficients of the Grothendieck-Serre semisimplicity conjecture.

Keywords

Cite

@article{arxiv.1702.07017,
  title  = {Geometric monodromy -- semisimplicity and maximality},
  author = {Anna Cadoret and Chun Yin Hui and Akio Tamagawa},
  journal= {arXiv preprint arXiv:1702.07017},
  year   = {2017}
}

Comments

To appear in Annals of Math

R2 v1 2026-06-22T18:25:53.633Z