Comparison between admissible and de Jong coverings of rigid analytic spaces in mixed characteristic

Abstract

If k is a complete non-archimedean field and X an adic space locally of finite type over Spa(k), let CovXoc (resp. CovXadm) be the category of \'etale coverings of X that are locally for the Berkovich overconvergent topology (resp. for the admissible topology) disjoint union of finite \'etale coverings. There is a natural inclusion CovXoc⊂eq CovXadm. Whether or not this inclusion is strict is a question initially asked by de Jong. Some partial answers have been given in the recents works of Achinger, Lara and Youcis in the finite or equal characteristic 0 cases. The purpose of this note is to show that this inclusion can be strict when k is of mixed characteristic (0,p) and p-closed. As a consequence, following the work of Achinger, Lara and Youcis, the natural morphism of Noohi groups π1dJ, \, adm(X) π1dJ, \,oc(X) is not an isomorphism in general.