A representative of R(N,T) for higher dimensional twists of Zpr(1)

Abstract

Let N/K be a Galois extension of p-adic number fields and let V be a p-adic representation of the absolute Galois group GK of K. The equivariant local ε-constant conjecture CEPna(N/K, V) is related to the compatibility of the equivariant Tamagawa number conjecture with the functional equation of Artin L-functions and it can be formulated as the vanishing of a certain element RN/K in K0( Zp[G], Qpc[G]). One of the main technical difficulties in the computation of RN/K arises from the so-called cohomological term CN/K, which requires the construction of a bounded complex CN,T of cohomologically trivial modules which represents R(N,T) for a full GK-stable Zp-sublattice T of V. In this paper we generalize the construction of CN,T in Thm. 2 of arXiv:1602.07858 to the case of a higher dimensional T.