A note on non-Robba p-adic differential equations

Abstract

Let M be a differential module, whose coefficients are analytic elements on an open annulus I (⊂ >0) in a valued field, complete and algebraically closed of inequal characteristic, and let R(M, r) be the radius of convergence of its solutions in the neighbourhood of the generic point tr of absolute value r, with r∈ I. Assume that R(M, r)<r on I and, in the logarithmic coordinates, the function r R(\ mathcalM, r) has only one slope on I. In this paper, we prove that for any r∈ I, all the solutions of M in the neighborhood of tr are analytic and bounded in the disk D(tr,R(M,r)-).