Galois representations over convergent de Rham period ring

Abstract

Let BdR+, ⊂ BdR+ be the ``convergent" de Rham period ring which is the (un-completed) stalk at the de Rham point of the Fargues--Fontaine curve. We develop a Tate--Sen formalism to relate Galois representations over BdR+, to regular connections over convergent functions. As a consequence, when the Sen weights (of the mod t reduction) satisfy a p-adic non-Liouville condition, Galois cohomology of a BdR+, -representation compares to that of its BdR+-base change, and hence is finite. In addition, restricted to objects whose Sen weights are algebraic numbers, the categories of BdR+, -representations and BdR+-representations are equivalent.