Normality of monodromy group in generic convolution group

Abstract

On an abelian variety A, sheaf convolution gives a Tannakian formalism for perverse sheaves. Let X be an irreducible algebraic variety with generic point η. Let K be a family of perverse sheaves (more precisely, a relative perverse sheaf) on the constant abelian scheme pX:A× X X. We show that for uncountably many character sheaves L on A, the monodromy groups of R0pX*(K pA*L) are normal in the Tannakian group G(K|Aη) of the perverse sheaf K|Aη∈Perv(Aη). This result is inspired from and could be compared to two other normality results: In the same setting, the Tannakian group G(K|Aη) is normal in G(K|Aη) (due to Lawrence-Sawin). For a polarizable variation of Hodge structures, outside a meager locus, the connected monodromy group is normal in the derived Mumford-Tate group (due to Andr\'e).