Reciprocity laws for (L,L)-modules over Lubin-Tate extensions
Abstract
In the Lubin-Tate setting we study pairings for analytic (L,L)-modules and prove an abstract reciprocity law which then implies a relation between the analogue of Perrin-Riou's Big Exponential map as developed by Berger and Fourquaux and a p-adic regulator map whose construction relies on the theory of Kisin-Ren modules generalising the concept of Wach modules to the Lubin-Tate situation.
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