Bessel F-isocrystals for reductive groups

Abstract

We construct the Frobenius structure on a rigid connection BeG on Gm for a split reductive group G introduced by Frenkel-Gross. These data form a G-valued overconvergent F-isocrystal BeG on Gm,Fp, which is the p-adic companion of the Kloosterman G-local system KlG constructed by Heinloth-Ng\o-Yun. By exploring the structure of the underlying differential equation, we calculate the monodromy group of BeG when G is almost simple (which recovers the calculation of monodromy group of KlG due to Katz and Heinloth-Ng\o-Yun), and establish functoriality between different Kloosterman G-local systems as conjectured by Heinloth-Ng\o-Yun. We show that the Frobenius Newton polygons of KlG are generically ordinary for every G and are everywhere ordinary on |Gm,Fp| when G is classical or G2.