Local Constants for Galois Representations - Some Explicit Results

Abstract

We can associate local constant to every continuous finite dimensional complex representation of the absolute Galois group GF of a non-archimedean local field F/Qp by Deligne and Langlands. To give explicit formula of local constant of a representation, we need to compute λ-functions explicitly. In this thesis we compute λK/F explicitly, where K/F is a finite degree Galois extension of a non-archimedean local field F, except when K/F is a wildly ramified quadratic extension with F2. Then by using this λ-function computation, in general, we give an invariant formula of local constant of finite dimensional Heisenberg representations of the absolute Galois group GF of a non-archimedean local field F. But for explicit invariant formula of local constant for a Heisenberg representation, we should have information about the dimension of a Heisenberg representation and the arithmetic description of the determinant of a Heisenberg representation. In this thesis, we give explicit arithmetic description of the determinant of Heisenberg representation. We also construct all Heisenberg representations of dimensions prime to p, and study their various properties. By using λ-function computation and arithmetic description of the determinant of Heisenberg representations, we give an invariant formula of local constant for a Heisenberg representation of dimension prime to p.