Rigid connections on P1 via the Bruhat-Tits building

Abstract

We apply the theory of fundamental strata of Bremer and Sage to find cohomologically rigid G-connections on the projective line, generalising the work of Frenkel and Gross. In this theory, one studies the leading term of a formal connection with respect to the Moy-Prasad filtration associated to a point in the Bruhat-Tits building. If the leading term is regular semisimple with centraliser a (not necessarily split) maximal torus S, then we have an S-toral connection. In this language, the irregular singularity of the Frenkel-Gross connection gives rise to the homogenous toral connection of minimal slope associated to the Coxeter torus C. In the present paper, we consider connections on Gm which have an irregular homogeneous C-toral singularity at zero of slope i/h, where h is the Coxeter number and i is a positive integer coprime to h, and a regular singularity at infinity with unipotent monodromy. Our main result is the characterisation of all such connections which are rigid.