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

Abstract

We consider a vector bundle with integrable connection (,) on an analytic domain U in the generic fiber η of a smooth formal p-adic scheme , in the sense of Berkovich. We define the diameter δ(,U) of U at ∈ U, the radius () of the point ∈η, the radius of convergence of solutions of (,) at , R() = R(, U,(, )). We discuss (semi-) continuity of these functions with respect to the Berkovich topology. In particular, under we prove under certain assumptions that δ(,U), () and R(U,,) are upper semicontinuous functions of ; for Laurent domains in the affine space, δ(-,U) is continuous. In the classical case of an affinoid domain U of the analytic affine line, R is a continuous function.