Iwasawa theory of de Rham (φ,)-modules over the Robba rings

Abstract

The aim of this article is to study Bloch-Kato's exponential map and Perrin-Riou's "big" exponential map purely in terms of (φ,)-modules over the Robba ring. We first generalize the definition of Bloch-Kato's exponential map for all the (φ,)-modules without using Fontaine's rings Bcris, BdR of p-adic periods and then we generalize the construction of Perrin-Riou's "big" exponential map for all the de Rham (φ,)-modules and prove that this map interpolates our Bloch-Kato's exponential map and the dual exponential map. Finally, we prove a theorem concerning to the determinant of our "big" exponential map, which is a generalization of Perrin-Riou's δ(V)-conjecture. The key ingredients for our study are Pottharst's theory of analytic Iwasawa cohomology and Berger's construction of p-adic differential equations associated to de Rham (φ,)-modules.