Logarithmic de Rham comparison for open rigid spaces

Abstract

In this note, we prove the logarithmic p-adic comparison theorem for open rigid analytic varieties. We prove that a smooth rigid analytic variety with a strict simple normal crossing divisor is locally K(π,1) (in a certain sense) with respect to Fp-local systems and ramified coverings along the divisor. We follow Scholze's method to produce a pro-version of the Faltings site and use this site to prove a primitive comparison theorem in our setting. After introducing period sheaves in our setting, we prove aforesaid comparison theorem.