Frobenius trace fields of cohomologically rigid local systems

Abstract

Let X/C be a smooth variety with simple normal crossings compactification X, and let L be an irreducible Q-local system on X with torsion determinant. Suppose L is cohomologically rigid. The pair (X, L) may be spread out to a finitely generated base, and therefore reduced modulo p for almost all p; the Frobenius traces of this mod p reduction lie in a number field Fp, by a theorem of Deligne. We investigate to what extent the fields Fp are bounded, meaning that they are contained in a fixed number field, independent of p. We prove a host of results around this question. For instance: assuming L has totally degenerate unipotent monodromy around some component of Z, then we prove that L admits a spreading out such that the Fp's are bounded; without any local monodromy assumptions, we show that the Fp's are bounded as soon as they are bounded at one point of X. We also speculate on the relation between the boundedness of the Fp's, and the local system L being strongly of geometric origin, a notion due to Langer-Simpson.