This course covers the structure theory of Galois groups of local fields, the rings of Witt vectors, the classification of p-adic representations via phi-modules, the tilting construction from the theory of perfectoid spaces, the ring of de Rham periods and the notion of a de Rham representation.
Learning objective
Understanding the construction of the ring of de Rham periods.
Content
In addition to the subjects mentioned in the abstract the course included the basic theory of local fields, l-adic local Galois representations, an oveview of perfectoid fields, the statements of the theorems of Fontaine-Winterberger and Faltings-Tsuji.
Literature
J.-M. Fontaine, Y. Ouyang. Theory of p-adic Galois representations. O. Brinon, B. Conrad. CMI summer school notes on p-adic Hodge theory.
Prerequisites / Notice
General topology, linear algebra, Galois theory.
Performance assessment
Performance assessment information (valid until the course unit is held again)