On Perrin-Riou's exponential map for (, )-modules
Abstract
Let K / Qp be a finite Galois extension and D a (, )-module over the Robba-ring Brig, K. We give a generalization of the Bloch-Kato exponential map for D using continuous Galois-cohomology groups Hi(GK, W(D)) for the B-pair W(D) associated to D. We construct a big exponential map D,h (h ∈ N) for cyclotomic extensions of K for D in the style of Perrin-Riou using the theory of Berger's B-pairs, which interpolates the generalized Bloch-Kato exponential maps on the finite levels.
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