Equivariant epsilon conjecture for 1-dimensional Lubin-Tate groups

Abstract

In this paper we formulate a conjecture on the relationship between the equivariant ε-constants (associated to a local p-adic representation V and a finite extension of local fields L/K) and local Galois cohomology groups of a Galois stable Zp-lattice T of V. We prove the conjecture for L/K being an unramified extension of degree prime to p and T being a p-adic Tate module of a one-dimensional Lubin-Tate group defined over Zp by extending the ideas of Breu from the case of the multiplicative group Gm to arbitrary one-dimensional Lubin-Tate groups. For the connection to the different formulations of the ε-conjecture in BB, FK, Breu, BlB and BF see Iz.