Broadly speaking, p-adic Hodge theory is the study of representations of Galois groups of p-adic fields on vector spaces with p-adic coefficients. One can use the theory of (ϕ,Γ)-modules to convert such Galois representations into simpler linear algebra, and one can also classify such representations in terms of how arithmetically interesting they are. In my talk, I will discuss extensions of this theory to p-adic families of Galois representations. Such families arise naturally in the contexts of Galois deformation rings and p-adic modular forms.
Freitag, den 16. Mai 2014 um 13:30 Uhr, in INF288, HS2 Freitag, den 16. Mai 2014 at 13:30, in INF288, HS2
Der Vortrag folgt der Einladung von The lecture takes place at invitation by Prof. Dr. O. Venjakob