Continuity of the radius of convergence of differential equations on p-adic analytic curves

Abstract

This paper deals with connections on p-adic analytic curves, in the sense of Berkovich. The curves must be compact but the connections are allowed to have a finite number of meromorphic singularities on them. For any choice of a semistable formal model of the curve, we define an intrinsic notion of normalized radius of convergence as a function on the curve, with values in (0,1]. For a sufficiently refined choice of the semistable model, we prove continuity and logarithmic concavity of that function. We characterize Robba connections, that is connections whose sheaf of solutions is constant on any open disk contained in the curve.