Variation of Tannaka groups of perverse sheaves in family

Abstract

Let k be a field of characteristic 0, let S be a smooth, geometrically connected variety over k, with generic point η, and f:X→ S a morphism separated and of finite type. Fix a prime . Let P be an f-universally locally acyclic relative perverse Q-sheaf on X/S. We prove that if for some (equivalently, every) geometric point η over η the restriction P|X η is simple as a perverse Q-sheaf on X η, then there is a non-empty open subscheme U⊂ S such that, for every geometric point s on U, the restriction P|X s is simple as a perverse Q-sheaf on X s. When f:X→ S is an abelian scheme, we give applications of this result to the variation with s∈ S of the Tannaka group of P|X s.